! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
! 
! Linear Algebra Data and Routines File
! 
! Generated by KPP-2.2.3 symbolic chemistry Kinetics PreProcessor
!       (http://www.cs.vt.edu/~asandu/Software/KPP)
! KPP is distributed under GPL, the general public licence
!       (http://www.gnu.org/copyleft/gpl.html)
! (C) 1995-1997, V. Damian & A. Sandu, CGRER, Univ. Iowa
! (C) 1997-2005, A. Sandu, Michigan Tech, Virginia Tech
!     With important contributions from:
!        M. Damian, Villanova University, USA
!        R. Sander, Max-Planck Institute for Chemistry, Mainz, Germany
! 
! File                 : aromatics_kpp_LinearAlgebra.f90
! Time                 : Fri Dec 20 17:45:08 2019
! Working directory    : /n/home08/kbates/Aromatics/GC_NOx_recycle
! Equation file        : aromatics_kpp.kpp
! Output root filename : aromatics_kpp
! 
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~



MODULE aromatics_kpp_LinearAlgebra

  USE aromatics_kpp_Parameters
  USE aromatics_kpp_JacobianSP

  IMPLICIT NONE

CONTAINS


! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
! 
! SPARSE_UTIL - SPARSE utility functions
!   Arguments :
! 
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~


! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
SUBROUTINE KppDecomp( JVS, IER )
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!        Sparse LU factorization
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~

  USE aromatics_kpp_Parameters
  USE aromatics_kpp_JacobianSP

      INTEGER  :: IER
      REAL(kind=dp) :: JVS(LU_NONZERO), W(NVAR), a
      INTEGER  :: k, kk, j, jj

      a = 0. ! mz_rs_20050606
      IER = 0
      DO k=1,NVAR
        ! mz_rs_20050606: don't check if real value == 0
        ! IF ( JVS( LU_DIAG(k) ) .EQ. 0. ) THEN
        IF ( ABS(JVS(LU_DIAG(k))) < TINY(a) ) THEN
            IER = k
            RETURN
        END IF
        DO kk = LU_CROW(k), LU_CROW(k+1)-1
              W( LU_ICOL(kk) ) = JVS(kk)
        END DO
        DO kk = LU_CROW(k), LU_DIAG(k)-1
            j = LU_ICOL(kk)
            a = -W(j) / JVS( LU_DIAG(j) )
            W(j) = -a
            DO jj = LU_DIAG(j)+1, LU_CROW(j+1)-1
               W( LU_ICOL(jj) ) = W( LU_ICOL(jj) ) + a*JVS(jj)
            END DO
         END DO
         DO kk = LU_CROW(k), LU_CROW(k+1)-1
            JVS(kk) = W( LU_ICOL(kk) )
         END DO
      END DO
      
END SUBROUTINE KppDecomp


! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
SUBROUTINE KppDecompCmplx( JVS, IER )
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!        Sparse LU factorization, complex
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~

  USE aromatics_kpp_Parameters
  USE aromatics_kpp_JacobianSP

      INTEGER        :: IER
      DOUBLE COMPLEX :: JVS(LU_NONZERO), W(NVAR), a
      REAL(kind=dp)  :: b = 0.0
      INTEGER        :: k, kk, j, jj

      IER = 0
      DO k=1,NVAR
        IF ( ABS(JVS(LU_DIAG(k))) < TINY(b) ) THEN
            IER = k
            RETURN
        END IF
        DO kk = LU_CROW(k), LU_CROW(k+1)-1
              W( LU_ICOL(kk) ) = JVS(kk)
        END DO
        DO kk = LU_CROW(k), LU_DIAG(k)-1
            j = LU_ICOL(kk)
            a = -W(j) / JVS( LU_DIAG(j) )
            W(j) = -a
            DO jj = LU_DIAG(j)+1, LU_CROW(j+1)-1
               W( LU_ICOL(jj) ) = W( LU_ICOL(jj) ) + a*JVS(jj)
            END DO
         END DO
         DO kk = LU_CROW(k), LU_CROW(k+1)-1
            JVS(kk) = W( LU_ICOL(kk) )
         END DO
      END DO
      
END SUBROUTINE KppDecompCmplx


! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
SUBROUTINE KppDecompCmplxR( JVSR, JVSI, IER )
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!    Sparse LU factorization, complex
!   (Real and Imaginary parts are used instead of complex data type)     
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~

  USE aromatics_kpp_Parameters
  USE aromatics_kpp_JacobianSP

      INTEGER       :: IER
      REAL(kind=dp) :: JVSR(LU_NONZERO), JVSI(LU_NONZERO) 
      REAL(kind=dp) :: WR(NVAR), WI(NVAR), ar, ai, den
      INTEGER       :: k, kk, j, jj

      IER = 0
      ar  = 0.0
      DO k=1,NVAR
        IF (  ( ABS(JVSR(LU_DIAG(k))) < TINY(ar) ) .AND. &
              ( ABS(JVSI(LU_DIAG(k))) < TINY(ar) ) )  THEN
            IER = k
            RETURN
        END IF
        DO kk = LU_CROW(k), LU_CROW(k+1)-1
              WR( LU_ICOL(kk) ) = JVSR(kk)
              WI( LU_ICOL(kk) ) = JVSI(kk)
        END DO
        DO kk = LU_CROW(k), LU_DIAG(k)-1
            j = LU_ICOL(kk)
            den = JVSR(LU_DIAG(j))**2 + JVSI(LU_DIAG(j))**2
            ar = -(WR(j)*JVSR(LU_DIAG(j)) + WI(j)*JVSI(LU_DIAG(j)))/den
            ai = -(WI(j)*JVSR(LU_DIAG(j)) - WR(j)*JVSI(LU_DIAG(j)))/den
            WR(j) = -ar
            WI(j) = -ai
            DO jj = LU_DIAG(j)+1, LU_CROW(j+1)-1
               WR( LU_ICOL(jj) ) = WR( LU_ICOL(jj) ) + ar*JVSR(jj) - ai*JVSI(jj)
               WI( LU_ICOL(jj) ) = WI( LU_ICOL(jj) ) + ar*JVSI(jj) + ai*JVSR(jj)
            END DO
         END DO
         DO kk = LU_CROW(k), LU_CROW(k+1)-1
            JVSR(kk) = WR( LU_ICOL(kk) )
            JVSI(kk) = WI( LU_ICOL(kk) )
         END DO
      END DO

END SUBROUTINE KppDecompCmplxR


! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
SUBROUTINE KppSolveIndirect( JVS, X )
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!        Sparse solve subroutine using indirect addressing
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~

  USE aromatics_kpp_Parameters
  USE aromatics_kpp_JacobianSP

      INTEGER  :: i, j
      REAL(kind=dp) :: JVS(LU_NONZERO), X(NVAR), sum

      DO i=1,NVAR
         DO j = LU_CROW(i), LU_DIAG(i)-1 
             X(i) = X(i) - JVS(j)*X(LU_ICOL(j));
         END DO  
      END DO

      DO i=NVAR,1,-1
        sum = X(i);
        DO j = LU_DIAG(i)+1, LU_CROW(i+1)-1
          sum = sum - JVS(j)*X(LU_ICOL(j));
        END DO
        X(i) = sum/JVS(LU_DIAG(i));
      END DO
      
END SUBROUTINE KppSolveIndirect


! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
SUBROUTINE KppSolveTRIndirect( JVS, X )
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!        Complex sparse solve transpose subroutine using indirect addressing
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~

  USE aromatics_kpp_Parameters
  USE aromatics_kpp_JacobianSP

      INTEGER       :: i, j
      REAL(kind=dp) :: JVS(LU_NONZERO), X(NVAR)

      DO i=1,NVAR
        X(i) = X(i)/JVS(LU_DIAG(i))
	! subtract all nonzero elements in row i of JVS from X
        DO j=LU_DIAG(i)+1,LU_CROW(i+1)-1
	  X(LU_ICOL(j)) = X(LU_ICOL(j))-JVS(j)*X(i)
	END DO
      END DO

      DO i=NVAR, 1, -1
	! subtract all nonzero elements in row i of JVS from X
        DO j=LU_CROW(i),LU_DIAG(i)-1
	  X(LU_ICOL(j)) = X(LU_ICOL(j))-JVS(j)*X(i)
	END DO
      END DO
      
END SUBROUTINE KppSolveTRIndirect


! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
SUBROUTINE KppSolveCmplx( JVS, X )
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!        Complex sparse solve subroutine using indirect addressing
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~

  USE aromatics_kpp_Parameters
  USE aromatics_kpp_JacobianSP

      INTEGER        :: i, j
      DOUBLE COMPLEX :: JVS(LU_NONZERO), X(NVAR), sum

      DO i=1,NVAR
         DO j = LU_CROW(i), LU_DIAG(i)-1 
             X(i) = X(i) - JVS(j)*X(LU_ICOL(j));
         END DO  
      END DO

      DO i=NVAR,1,-1
        sum = X(i);
        DO j = LU_DIAG(i)+1, LU_CROW(i+1)-1
          sum = sum - JVS(j)*X(LU_ICOL(j));
        END DO
        X(i) = sum/JVS(LU_DIAG(i));
      END DO
      
END SUBROUTINE KppSolveCmplx

! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
SUBROUTINE KppSolveCmplxR( JVSR, JVSI, XR, XI )
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!   Complex sparse solve subroutine using indirect addressing
!   (Real and Imaginary parts are used instead of complex data type)     
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~

  USE aromatics_kpp_Parameters
  USE aromatics_kpp_JacobianSP

      INTEGER       ::  i, j
      REAL(kind=dp) ::  JVSR(LU_NONZERO), JVSI(LU_NONZERO), XR(NVAR), XI(NVAR), sumr, sumi, den

      DO i=1,NVAR
         DO j = LU_CROW(i), LU_DIAG(i)-1 
             XR(i) = XR(i) - (JVSR(j)*XR(LU_ICOL(j)) - JVSI(j)*XI(LU_ICOL(j)))
             XI(i) = XI(i) - (JVSR(j)*XI(LU_ICOL(j)) + JVSI(j)*XR(LU_ICOL(j)))
         END DO  
      END DO

      DO i=NVAR,1,-1
        sumr = XR(i); sumi = XI(i)
        DO j = LU_DIAG(i)+1, LU_CROW(i+1)-1
            sumr = sumr - (JVSR(j)*XR(LU_ICOL(j)) - JVSI(j)*XI(LU_ICOL(j)))
            sumi = sumi - (JVSR(j)*XI(LU_ICOL(j)) + JVSI(j)*XR(LU_ICOL(j)))
        END DO
        den   = JVSR(LU_DIAG(i))**2 + JVSI(LU_DIAG(i))**2
        XR(i) = (sumr*JVSR(LU_DIAG(i)) + sumi*JVSI(LU_DIAG(i)))/den
        XI(i) = (sumi*JVSR(LU_DIAG(i)) - sumr*JVSI(LU_DIAG(i)))/den
      END DO
      
END SUBROUTINE KppSolveCmplxR


! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
SUBROUTINE KppSolveTRCmplx( JVS, X )
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!        Complex sparse solve transpose subroutine using indirect addressing
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~

  USE aromatics_kpp_Parameters
  USE aromatics_kpp_JacobianSP

      INTEGER        :: i, j
      DOUBLE COMPLEX :: JVS(LU_NONZERO), X(NVAR)

      DO i=1,NVAR
        X(i) = X(i)/JVS(LU_DIAG(i))
	! subtract all nonzero elements in row i of JVS from X
        DO j=LU_DIAG(i)+1,LU_CROW(i+1)-1
	  X(LU_ICOL(j)) = X(LU_ICOL(j))-JVS(j)*X(i)
	END DO
      END DO

      DO i=NVAR, 1, -1
	! subtract all nonzero elements in row i of JVS from X
        DO j=LU_CROW(i),LU_DIAG(i)-1
	  X(LU_ICOL(j)) = X(LU_ICOL(j))-JVS(j)*X(i)
	END DO
      END DO
      
END SUBROUTINE KppSolveTRCmplx


! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
SUBROUTINE KppSolveTRCmplxR( JVSR, JVSI, XR, XI )
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!   Complex sparse solve transpose subroutine using indirect addressing
!   (Real and Imaginary parts are used instead of complex data type)     
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~

  USE aromatics_kpp_Parameters
  USE aromatics_kpp_JacobianSP

      INTEGER       ::  i, j
      REAL(kind=dp) ::  JVSR(LU_NONZERO), JVSI(LU_NONZERO), XR(NVAR), XI(NVAR), den

      DO i=1,NVAR
        den   = JVSR(LU_DIAG(i))**2 + JVSI(LU_DIAG(i))**2
        XR(i) = (XR(i)*JVSR(LU_DIAG(i)) + XI(i)*JVSI(LU_DIAG(i)))/den
        XI(i) = (XI(i)*JVSR(LU_DIAG(i)) - XR(i)*JVSI(LU_DIAG(i)))/den
	! subtract all nonzero elements in row i of JVS from X
        DO j=LU_DIAG(i)+1,LU_CROW(i+1)-1
	  XR(LU_ICOL(j)) = XR(LU_ICOL(j))-(JVSR(j)*XR(i) - JVSI(j)*XI(i))
	  XI(LU_ICOL(j)) = XI(LU_ICOL(j))-(JVSI(j)*XR(i) + JVSR(j)*XI(i))
	END DO
      END DO

      DO i=NVAR, 1, -1
	! subtract all nonzero elements in row i of JVS from X
        DO j=LU_CROW(i),LU_DIAG(i)-1
	  XR(LU_ICOL(j)) = XR(LU_ICOL(j))-(JVSR(j)*XR(i) - JVSI(j)*XI(i))
	  XI(LU_ICOL(j)) = XI(LU_ICOL(j))-(JVSI(j)*XR(i) + JVSR(j)*XI(i))
	END DO
      END DO
      
END SUBROUTINE KppSolveTRCmplxR


!
! Next few commented subroutines perform sparse big linear algebra
!
!! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!SUBROUTINE KppDecompBig( JVS, IP, IER )
!! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!!        Sparse LU factorization
!!        for the Runge Kutta (3n)x(3n) linear system
!! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!
!  USE aromatics_kpp_Parameters
!  USE aromatics_kpp_JacobianSP
!
!      INTEGER  :: IP3(3), IER, IP(3,NVAR)
!      REAL(kind=dp) :: JVS(3,3,LU_NONZERO), W(3,3,NVAR), a(3,3), E(3,3)
!      INTEGER  :: k, kk, j, jj
!
!      a = 0.0d0
!      IER = 0
!      DO k=1,NVAR
!        DO kk = LU_CROW(k), LU_CROW(k+1)-1
!              W( 1:3,1:3,LU_ICOL(kk) ) = JVS(1:3,1:3,kk)
!        END DO
!        DO kk = LU_CROW(k), LU_DIAG(k)-1
!            j = LU_ICOL(kk)
!            E(1:3,1:3) = JVS( 1:3,1:3,LU_DIAG(j) )
!            ! CALL DGETRF(3,3,E,3,IP3,IER) 
!            CALL FAC3(E,IP3,IER)
!            IF ( IER /= 0 )  RETURN
!            ! a = W(j) / JVS( LU_DIAG(j) )
!            a(1:3,1:3) = W( 1:3,1:3,j )
!            ! CALL DGETRS ('N',3,3,E,3,IP3,a,3,IER) 
!            CALL SOL3('N',E,IP3,a(1,1))
!            CALL SOL3('N',E,IP3,a(1,2))
!            CALL SOL3('N',E,IP3,a(1,3))
!            W(1:3,1:3,j) = a(1:3,1:3)
!            DO jj = LU_DIAG(j)+1, LU_CROW(j+1)-1
!               W( 1:3,1:3,LU_ICOL(jj) ) = W( 1:3,1:3,LU_ICOL(jj) ) &
!                        - MATMUL( a(1:3,1:3) , JVS(1:3,1:3,jj) )
!            END DO
!         END DO
!         DO kk = LU_CROW(k), LU_CROW(k+1)-1
!            JVS(1:3,1:3,kk) = W( 1:3,1:3,LU_ICOL(kk) )
!         END DO
!      END DO
!
!      DO k=1,NVAR
!         ! CALL WGEFA(JVS(1,1,LU_DIAG(k)),3,3,IP(1,k),IER)
!         ! CALL DGETRF(3,3,JVS(1,1,LU_DIAG(k)),3,IP(1,k),IER)
!         CALL FAC3(JVS(1,1,LU_DIAG(k)),IP(1,k),IER)
!         IF ( IER /= 0 )  RETURN
!      END DO 
!      
!END SUBROUTINE KppDecompBig
!
!
!! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!SUBROUTINE KppSolveBig( JVS, IP, X )
!! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!!        Sparse solve subroutine using indirect addressing
!!        for the Runge Kutta (3n)x(3n) linear system
!! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!
!  USE aromatics_kpp_Parameters
!  USE aromatics_kpp_JacobianSP
!
!      INTEGER  :: i, j, k, m, IP3(3), IP(3,NVAR), IER
!      REAL(kind=dp) :: JVS(3,3,LU_NONZERO), X(3,NVAR), sum(3)
!
!      DO i=1,NVAR
!        DO j = LU_CROW(i), LU_DIAG(i)-1 
!          !X(1:3,i) = X(1:3,i) - MATMUL(JVS(1:3,1:3,j),X(1:3,LU_ICOL(j)));
!          DO k=1,3
!            DO m=1,3
!	       X(k,i) = X(k,i) - JVS(k,m,j)*X(m,LU_ICOL(j))
!            END DO
!          END DO
!        END DO  
!      END DO
!
!      DO i=NVAR,1,-1
!        sum(1:3) = X(1:3,i);
!        DO j = LU_DIAG(i)+1, LU_CROW(i+1)-1
!          !sum(1:3) = sum(1:3) - MATMUL(JVS(1:3,1:3,j),X(1:3,LU_ICOL(j)));
!          DO k=1,3
!            DO m=1,3
!	       sum(k) = sum(k) - JVS(k,m,j)*X(m,LU_ICOL(j))
!            END DO
!          END DO
!        END DO
!        ! X(i) = sum/JVS(LU_DIAG(i));
!        ! CALL DGETRS ('N',3,1,JVS(1:3,1:3,LU_DIAG(i)),3,IP(1,i),sum,3,0) 
!        ! CALL WGESL('N',JVS(1,1,LU_DIAG(i)),3,3,IP(1,i),sum)
!        CALL SOL3('N',JVS(1,1,LU_DIAG(i)),IP(1,i),sum)
!        X(1:3,i) = sum(1:3)
!      END DO
!      
!END SUBROUTINE KppSolveBig
!
!
!! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!SUBROUTINE KppSolveBigTR( JVS, IP, X )
!! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!!        Big sparse transpose solve using indirect addressing
!! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!
!  USE aromatics_kpp_Parameters
!  USE aromatics_kpp_JacobianSP
!
!      INTEGER       :: i, j, k, m, IP(3,NVAR)
!      REAL(kind=dp) :: JVS(3,3,LU_NONZERO), X(3,NVAR)
!
!      DO i=1,NVAR
!        ! X(i) = X(i)/JVS(LU_DIAG(i))
!        CALL SOL3('T',JVS(1,1,LU_DIAG(i)),IP(1,i),X(1,i))
!        DO j=LU_DIAG(i)+1,LU_CROW(i+1)-1
!	  !X(1:3,LU_ICOL(j)) = X(1:3,LU_ICOL(j)) &
!          !    - MATMUL( TRANSPOSE(JVS(1:3,1:3,j)), X(1:3,i) )
!          DO k=1,3
!            DO m=1,3
!	       X(k,LU_ICOL(j)) = X(k,LU_ICOL(j)) - JVS(m,k,j)*X(m,i)
!            END DO
!          END DO
!	END DO
!      END DO
!
!      DO i=NVAR, 1, -1
!        DO j=LU_CROW(i),LU_DIAG(i)-1
!	  !X(1:3,LU_ICOL(j)) = X(1:3,LU_ICOL(j)) &
!          !   - MATMUL( TRANSPOSE(JVS(1:3,1:3,j)), X(1:3,i) )
!          DO k=1,3
!            DO m=1,3
!	       X(k,LU_ICOL(j)) = X(k,LU_ICOL(j)) - JVS(m,k,j)*X(m,i)
!            END DO
!          END DO
!	END DO
!      END DO
!      
!END SUBROUTINE KppSolveBigTR
!
!
!
!! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!SUBROUTINE FAC3(A,IPVT,INFO)
!! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!!     FAC3 FACTORS THE MATRIX A (3,3) BY
!!           GAUSS ELIMINATION WITH PARTIAL PIVOTING
!!     LINPACK - LIKE 
!!
!!     Remove comments to perform pivoting
!! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!!
!      REAL(kind=dp) :: A(3,3)
!      INTEGER       :: IPVT(3),INFO
!!      INTEGER       :: L
!!      REAL(kind=dp) :: t, dmax, da, TMP(3)
!      REAL(kind=dp), PARAMETER :: ZERO = 0.0, ONE = 1.0
!
!      info = 0
!!      t = TINY(da)
!!      
!!      da = ABS(A(1,1)); L = 1
!!      IF ( ABS(A(2,1))>da ) THEN
!!        da = ABS(A(2,1)); L = 2
!!        IF ( ABS(A(3,1))>da ) THEN
!!          L = 3
!!        END IF  
!!      END IF  
!!      IPVT(1)  = L
!!      IF (L /=1 ) THEN
!!         TMP(1:3) = A(L,1:3)
!!         A(L,1:3) = A(1,1:3)
!!         A(1,1:3) = TMP(1:3)
!!      END IF
!!      IF (ABS(A(1,1)) < t) THEN
!!         info = 1
!!         return
!!      END IF   
!!
!      A(2,1) = A(2,1)/A(1,1)
!      A(2,2) = A(2,2) - A(2,1)*A(1,2)
!      A(2,3) = A(2,3) - A(2,1)*A(1,3)
!      A(3,1) = A(3,1)/A(1,1)
!      A(3,2) = A(3,2) - A(3,1)*A(1,2)
!      A(3,3) = A(3,3) - A(3,1)*A(1,3)
!      
!!      IPVT(2)  = 2
!!      IF (ABS(A(3,2))>ABS(A(2,2))) THEN
!!         IPVT(2)  = 3
!!         TMP(2:3) = A(3,2:3)
!!         A(3,2:3) = A(2,2:3)
!!         A(2,2:3) = TMP(2:3)
!!      END IF
!!      IF (ABS(A(2,2)) < t) THEN
!!         info = 1
!!         return
!!      END IF   
!!      
!      A(3,2)   = A(3,2)/A(2,2)
!      A(3,3)   = A(3,3) - A(3,2)*A(2,3)
!      IPVT(3)  = 3
!      
!END SUBROUTINE FAC3
!
!
!! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!SUBROUTINE SOL3(Trans,A,IPVT,b)
!! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!!     SOL3 solves the system 3x3
!!     A * x = b  or  trans(a) * x = b
!!     using the factors computed by WGEFA.
!!
!!     Trans      = 'N'   to solve  A*x = b ,
!!                = 'T'   to solve  transpose(A)*x = b
!!     LINPACK - LIKE 
!!
!!     Remove comments to use pivoting
!! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
!
!      CHARACTER     :: Trans
!      REAL(kind=dp) :: a(3,3),b(3)
!      INTEGER       :: IPVT(3)
!!      INTEGER       :: L
!!      REAL(kind=dp) :: TMP
!      
!      SELECT CASE (Trans)
!
!      CASE ('n','N')  !  Solve  A * x = b
!
!!     Solve  L*y = b
!!         L = IPVT(1)
!!         IF (L /= 1) THEN
!!            TMP = B(1); B(1) = B(L); B(L) = TMP
!!         END IF
!         b(2) = b(2)-A(2,1)*b(1)
!         b(3) = b(3)-A(3,1)*b(1)
!         
!!         L = IPVT(2)
!!         IF (L /= 2) THEN
!!            TMP = B(2); B(2) = B(L); B(L) = TMP
!!         END IF
!         b(3) = b(3)-A(3,2)*b(2)
!
!!     Solve  U*x = y
!         b(3) = b(3)/A(3,3)
!         b(2) = (b(2)-A(2,3)*b(3))/A(2,2)
!         b(1) = (b(1)-A(1,3)*b(3)-A(1,2)*b(2))/A(1,1)
!      
!      
!      CASE ('t','T')  !  Solve transpose(A) * x = b
!
!!      Solve transpose(U)*y = b
!         b(1) = b(1)/A(1,1)
!         b(2) = (b(2)-A(1,2)*b(1))/A(2,2)
!         b(3) = (b(3)-A(1,3)*b(1)-A(2,3)*b(2))/A(3,3)
!
!!      Solve transpose(L)*x = y
!         b(2) = b(2)-A(3,2)*b(3)
!!         L = ipvt(2)
!!         IF (L /= 2) THEN
!!            TMP = B(2); B(2) = B(L); B(L) = TMP
!!         END IF
!         b(1) = b(1)-A(3,1)*b(3)-A(2,1)*b(2)
!!         L = ipvt(1)
!!         IF (L /= 1) THEN
!!            TMP = B(1); B(1) = B(L); B(L) = TMP
!!         END IF
!   
!      END SELECT
!
!END SUBROUTINE SOL3

! End of SPARSE_UTIL function
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~


! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
! 
! KppSolve - sparse back substitution
!   Arguments :
!      JVS       - sparse Jacobian of variables
!      X         - Vector for variables
! 
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~

SUBROUTINE KppSolve ( JVS, X )

! JVS - sparse Jacobian of variables
  REAL(kind=dp) :: JVS(LU_NONZERO)
! X - Vector for variables
  REAL(kind=dp) :: X(NVAR)

  X(57) = X(57)-JVS(228)*X(30)
  X(58) = X(58)-JVS(233)*X(36)
  X(61) = X(61)-JVS(248)*X(28)
  X(67) = X(67)-JVS(284)*X(48)
  X(73) = X(73)-JVS(319)*X(68)
  X(78) = X(78)-JVS(344)*X(75)
  X(81) = X(81)-JVS(359)*X(57)-JVS(360)*X(58)-JVS(361)*X(67)
  X(91) = X(91)-JVS(431)*X(77)
  X(94) = X(94)-JVS(451)*X(46)
  X(97) = X(97)-JVS(480)*X(34)
  X(98) = X(98)-JVS(487)*X(52)
  X(103) = X(103)-JVS(522)*X(102)
  X(104) = X(104)-JVS(528)*X(89)-JVS(529)*X(97)-JVS(530)*X(103)
  X(105) = X(105)-JVS(561)*X(43)-JVS(562)*X(44)-JVS(563)*X(91)-JVS(564)*X(93)-JVS(565)*X(100)
  X(106) = X(106)-JVS(587)*X(100)
  X(108) = X(108)-JVS(603)*X(37)-JVS(604)*X(41)-JVS(605)*X(42)-JVS(606)*X(72)-JVS(607)*X(79)-JVS(608)*X(80)-JVS(609)&
             &*X(100)
  X(109) = X(109)-JVS(617)*X(107)
  X(111) = X(111)-JVS(648)*X(30)-JVS(649)*X(32)-JVS(650)*X(36)-JVS(651)*X(48)-JVS(652)*X(68)-JVS(653)*X(69)-JVS(654)&
             &*X(73)-JVS(655)*X(93)-JVS(656)*X(107)-JVS(657)*X(108)-JVS(658)*X(110)
  X(112) = X(112)-JVS(672)*X(49)-JVS(673)*X(54)-JVS(674)*X(88)
  X(113) = X(113)-JVS(694)*X(100)
  X(114) = X(114)-JVS(704)*X(31)-JVS(705)*X(51)
  X(115) = X(115)-JVS(715)*X(82)
  X(116) = X(116)-JVS(722)*X(64)-JVS(723)*X(100)-JVS(724)*X(107)-JVS(725)*X(110)-JVS(726)*X(115)
  X(118) = X(118)-JVS(749)*X(82)-JVS(750)*X(100)-JVS(751)*X(115)
  X(119) = X(119)-JVS(759)*X(68)-JVS(760)*X(74)-JVS(761)*X(75)-JVS(762)*X(90)-JVS(763)*X(93)-JVS(764)*X(106)-JVS(765)&
             &*X(108)-JVS(766)*X(115)-JVS(767)*X(118)
  X(121) = X(121)-JVS(790)*X(83)-JVS(791)*X(117)
  X(122) = X(122)-JVS(801)*X(74)-JVS(802)*X(102)
  X(123) = X(123)-JVS(812)*X(31)-JVS(813)*X(52)
  X(125) = X(125)-JVS(830)*X(66)-JVS(831)*X(98)-JVS(832)*X(123)
  X(126) = X(126)-JVS(843)*X(75)-JVS(844)*X(79)-JVS(845)*X(80)
  X(127) = X(127)-JVS(854)*X(63)-JVS(855)*X(103)
  X(128) = X(128)-JVS(866)*X(83)-JVS(867)*X(87)-JVS(868)*X(117)
  X(129) = X(129)-JVS(879)*X(64)-JVS(880)*X(103)
  X(131) = X(131)-JVS(900)*X(44)-JVS(901)*X(55)
  X(132) = X(132)-JVS(915)*X(30)-JVS(916)*X(36)-JVS(917)*X(47)-JVS(918)*X(48)-JVS(919)*X(50)-JVS(920)*X(63)-JVS(921)&
             &*X(66)-JVS(922)*X(68)-JVS(923)*X(70)-JVS(924)*X(72)-JVS(925)*X(74)-JVS(926)*X(76)-JVS(927)*X(79)-JVS(928)&
             &*X(80)-JVS(929)*X(83)-JVS(930)*X(84)-JVS(931)*X(87)-JVS(932)*X(94)-JVS(933)*X(97)-JVS(934)*X(99)-JVS(935)&
             &*X(100)-JVS(936)*X(101)-JVS(937)*X(102)-JVS(938)*X(103)-JVS(939)*X(106)-JVS(940)*X(107)-JVS(941)*X(108)&
             &-JVS(942)*X(109)-JVS(943)*X(110)-JVS(944)*X(111)-JVS(945)*X(113)-JVS(946)*X(114)-JVS(947)*X(115)-JVS(948)&
             &*X(116)-JVS(949)*X(117)-JVS(950)*X(118)-JVS(951)*X(119)-JVS(952)*X(120)-JVS(953)*X(121)-JVS(954)*X(122)&
             &-JVS(955)*X(123)-JVS(956)*X(124)-JVS(957)*X(125)-JVS(958)*X(126)-JVS(959)*X(127)-JVS(960)*X(128)-JVS(961)&
             &*X(129)-JVS(962)*X(130)-JVS(963)*X(131)
  X(134) = X(134)-JVS(998)*X(70)-JVS(999)*X(99)-JVS(1000)*X(102)
  X(135) = X(135)-JVS(1012)*X(32)-JVS(1013)*X(36)-JVS(1014)*X(48)-JVS(1015)*X(66)-JVS(1016)*X(68)-JVS(1017)*X(69)&
             &-JVS(1018)*X(73)-JVS(1019)*X(74)-JVS(1020)*X(75)-JVS(1021)*X(76)-JVS(1022)*X(92)-JVS(1023)*X(93)-JVS(1024)&
             &*X(95)-JVS(1025)*X(97)-JVS(1026)*X(106)-JVS(1027)*X(108)-JVS(1028)*X(113)-JVS(1029)*X(115)-JVS(1030)*X(116)&
             &-JVS(1031)*X(117)-JVS(1032)*X(118)-JVS(1033)*X(120)-JVS(1034)*X(122)-JVS(1035)*X(124)-JVS(1036)*X(125)&
             &-JVS(1037)*X(126)-JVS(1038)*X(129)-JVS(1039)*X(130)-JVS(1040)*X(133)-JVS(1041)*X(134)
  X(136) = X(136)-JVS(1062)*X(72)-JVS(1063)*X(79)-JVS(1064)*X(80)-JVS(1065)*X(100)-JVS(1066)*X(124)
  X(137) = X(137)-JVS(1077)*X(72)-JVS(1078)*X(79)-JVS(1079)*X(80)-JVS(1080)*X(102)
  X(138) = X(138)-JVS(1089)*X(63)-JVS(1090)*X(68)-JVS(1091)*X(70)-JVS(1092)*X(75)-JVS(1093)*X(78)-JVS(1094)*X(87)&
             &-JVS(1095)*X(90)-JVS(1096)*X(93)-JVS(1097)*X(94)-JVS(1098)*X(97)-JVS(1099)*X(99)-JVS(1100)*X(102)-JVS(1101)&
             &*X(108)-JVS(1102)*X(113)-JVS(1103)*X(115)-JVS(1104)*X(118)-JVS(1105)*X(120)-JVS(1106)*X(121)-JVS(1107)*X(124)&
             &-JVS(1108)*X(125)-JVS(1109)*X(126)-JVS(1110)*X(127)-JVS(1111)*X(128)-JVS(1112)*X(130)-JVS(1113)*X(133)&
             &-JVS(1114)*X(134)-JVS(1115)*X(136)-JVS(1116)*X(137)
  X(139) = X(139)-JVS(1134)*X(72)-JVS(1135)*X(79)-JVS(1136)*X(80)-JVS(1137)*X(99)-JVS(1138)*X(102)-JVS(1139)*X(137)
  X(140) = X(140)-JVS(1151)*X(85)-JVS(1152)*X(102)-JVS(1153)*X(107)-JVS(1154)*X(110)-JVS(1155)*X(133)
  X(141) = X(141)-JVS(1164)*X(43)-JVS(1165)*X(81)-JVS(1166)*X(91)-JVS(1167)*X(93)-JVS(1168)*X(126)-JVS(1169)*X(136)&
             &-JVS(1170)*X(137)-JVS(1171)*X(140)
  X(142) = X(142)-JVS(1182)*X(55)-JVS(1183)*X(60)-JVS(1184)*X(63)-JVS(1185)*X(65)-JVS(1186)*X(89)-JVS(1187)*X(103)&
             &-JVS(1188)*X(120)-JVS(1189)*X(124)-JVS(1190)*X(127)-JVS(1191)*X(129)-JVS(1192)*X(130)-JVS(1193)*X(131)&
             &-JVS(1194)*X(133)-JVS(1195)*X(137)-JVS(1196)*X(140)-JVS(1197)*X(141)
  X(143) = X(143)-JVS(1215)*X(82)-JVS(1216)*X(115)-JVS(1217)*X(118)-JVS(1218)*X(124)-JVS(1219)*X(137)-JVS(1220)*X(140)
  X(144) = X(144)-JVS(1231)*X(72)-JVS(1232)*X(79)-JVS(1233)*X(80)-JVS(1234)*X(86)-JVS(1235)*X(102)-JVS(1236)*X(137)&
             &-JVS(1237)*X(140)
  X(145) = X(145)-JVS(1248)*X(61)-JVS(1249)*X(77)-JVS(1250)*X(87)-JVS(1251)*X(100)-JVS(1252)*X(102)-JVS(1253)*X(103)&
             &-JVS(1254)*X(120)-JVS(1255)*X(124)-JVS(1256)*X(126)-JVS(1257)*X(128)-JVS(1258)*X(133)-JVS(1259)*X(136)&
             &-JVS(1260)*X(137)-JVS(1261)*X(139)-JVS(1262)*X(140)-JVS(1263)*X(144)
  X(146) = X(146)-JVS(1274)*X(51)-JVS(1275)*X(57)-JVS(1276)*X(58)-JVS(1277)*X(64)-JVS(1278)*X(67)-JVS(1279)*X(81)&
             &-JVS(1280)*X(82)-JVS(1281)*X(85)-JVS(1282)*X(91)-JVS(1283)*X(93)-JVS(1284)*X(96)-JVS(1285)*X(107)-JVS(1286)&
             &*X(110)-JVS(1287)*X(114)-JVS(1288)*X(115)-JVS(1289)*X(117)-JVS(1290)*X(118)-JVS(1291)*X(121)-JVS(1292)*X(122)&
             &-JVS(1293)*X(123)-JVS(1294)*X(124)-JVS(1295)*X(126)-JVS(1296)*X(127)-JVS(1297)*X(128)-JVS(1298)*X(129)&
             &-JVS(1299)*X(130)-JVS(1300)*X(133)-JVS(1301)*X(134)-JVS(1302)*X(136)-JVS(1303)*X(137)-JVS(1304)*X(139)&
             &-JVS(1305)*X(140)-JVS(1306)*X(141)-JVS(1307)*X(143)-JVS(1308)*X(144)-JVS(1309)*X(145)
  X(147) = X(147)-JVS(1323)*X(68)-JVS(1324)*X(69)-JVS(1325)*X(70)-JVS(1326)*X(75)-JVS(1327)*X(76)-JVS(1328)*X(78)&
             &-JVS(1329)*X(84)-JVS(1330)*X(86)-JVS(1331)*X(87)-JVS(1332)*X(89)-JVS(1333)*X(90)-JVS(1334)*X(92)-JVS(1335)&
             &*X(94)-JVS(1336)*X(95)-JVS(1337)*X(98)-JVS(1338)*X(99)-JVS(1339)*X(100)-JVS(1340)*X(101)-JVS(1341)*X(102)&
             &-JVS(1342)*X(103)-JVS(1343)*X(108)-JVS(1344)*X(111)-JVS(1345)*X(113)-JVS(1346)*X(115)-JVS(1347)*X(116)&
             &-JVS(1348)*X(117)-JVS(1349)*X(118)-JVS(1350)*X(119)-JVS(1351)*X(120)-JVS(1352)*X(122)-JVS(1353)*X(123)&
             &-JVS(1354)*X(124)-JVS(1355)*X(126)-JVS(1356)*X(128)-JVS(1357)*X(129)-JVS(1358)*X(132)-JVS(1359)*X(133)&
             &-JVS(1360)*X(134)-JVS(1361)*X(135)-JVS(1362)*X(136)-JVS(1363)*X(137)-JVS(1364)*X(138)-JVS(1365)*X(139)&
             &-JVS(1366)*X(140)-JVS(1367)*X(141)-JVS(1368)*X(142)-JVS(1369)*X(143)-JVS(1370)*X(144)-JVS(1371)*X(145)&
             &-JVS(1372)*X(146)
  X(148) = X(148)-JVS(1385)*X(28)-JVS(1386)*X(29)-JVS(1387)*X(31)-JVS(1388)*X(32)-JVS(1389)*X(37)-JVS(1390)*X(38)&
             &-JVS(1391)*X(39)-JVS(1392)*X(40)-JVS(1393)*X(41)-JVS(1394)*X(42)-JVS(1395)*X(43)-JVS(1396)*X(44)-JVS(1397)&
             &*X(45)-JVS(1398)*X(50)-JVS(1399)*X(51)-JVS(1400)*X(52)-JVS(1401)*X(53)-JVS(1402)*X(54)-JVS(1403)*X(55)&
             &-JVS(1404)*X(56)-JVS(1405)*X(60)-JVS(1406)*X(62)-JVS(1407)*X(63)-JVS(1408)*X(64)-JVS(1409)*X(65)-JVS(1410)&
             &*X(66)-JVS(1411)*X(68)-JVS(1412)*X(69)-JVS(1413)*X(70)-JVS(1414)*X(71)-JVS(1415)*X(72)-JVS(1416)*X(73)&
             &-JVS(1417)*X(74)-JVS(1418)*X(75)-JVS(1419)*X(76)-JVS(1420)*X(77)-JVS(1421)*X(78)-JVS(1422)*X(79)-JVS(1423)&
             &*X(80)-JVS(1424)*X(81)-JVS(1425)*X(82)-JVS(1426)*X(83)-JVS(1427)*X(84)-JVS(1428)*X(85)-JVS(1429)*X(86)&
             &-JVS(1430)*X(87)-JVS(1431)*X(88)-JVS(1432)*X(89)-JVS(1433)*X(90)-JVS(1434)*X(91)-JVS(1435)*X(92)-JVS(1436)&
             &*X(93)-JVS(1437)*X(94)-JVS(1438)*X(95)-JVS(1439)*X(96)-JVS(1440)*X(97)-JVS(1441)*X(98)-JVS(1442)*X(99)&
             &-JVS(1443)*X(100)-JVS(1444)*X(101)-JVS(1445)*X(102)-JVS(1446)*X(103)-JVS(1447)*X(104)-JVS(1448)*X(105)&
             &-JVS(1449)*X(106)-JVS(1450)*X(107)-JVS(1451)*X(108)-JVS(1452)*X(109)-JVS(1453)*X(110)-JVS(1454)*X(111)&
             &-JVS(1455)*X(112)-JVS(1456)*X(113)-JVS(1457)*X(114)-JVS(1458)*X(115)-JVS(1459)*X(116)-JVS(1460)*X(117)&
             &-JVS(1461)*X(118)-JVS(1462)*X(119)-JVS(1463)*X(120)-JVS(1464)*X(121)-JVS(1465)*X(122)-JVS(1466)*X(123)&
             &-JVS(1467)*X(124)-JVS(1468)*X(125)-JVS(1469)*X(126)-JVS(1470)*X(127)-JVS(1471)*X(128)-JVS(1472)*X(129)&
             &-JVS(1473)*X(130)-JVS(1474)*X(131)-JVS(1475)*X(132)-JVS(1476)*X(133)-JVS(1477)*X(134)-JVS(1478)*X(135)&
             &-JVS(1479)*X(136)-JVS(1480)*X(137)-JVS(1481)*X(138)-JVS(1482)*X(139)-JVS(1483)*X(140)-JVS(1484)*X(141)&
             &-JVS(1485)*X(142)-JVS(1486)*X(143)-JVS(1487)*X(144)-JVS(1488)*X(145)-JVS(1489)*X(146)-JVS(1490)*X(147)
  X(149) = X(149)-JVS(1502)*X(38)-JVS(1503)*X(57)-JVS(1504)*X(58)-JVS(1505)*X(61)-JVS(1506)*X(67)-JVS(1507)*X(69)&
             &-JVS(1508)*X(73)-JVS(1509)*X(86)-JVS(1510)*X(89)-JVS(1511)*X(90)-JVS(1512)*X(91)-JVS(1513)*X(92)-JVS(1514)&
             &*X(93)-JVS(1515)*X(95)-JVS(1516)*X(97)-JVS(1517)*X(99)-JVS(1518)*X(101)-JVS(1519)*X(102)-JVS(1520)*X(103)&
             &-JVS(1521)*X(107)-JVS(1522)*X(108)-JVS(1523)*X(110)-JVS(1524)*X(113)-JVS(1525)*X(114)-JVS(1526)*X(115)&
             &-JVS(1527)*X(117)-JVS(1528)*X(118)-JVS(1529)*X(120)-JVS(1530)*X(121)-JVS(1531)*X(122)-JVS(1532)*X(123)&
             &-JVS(1533)*X(124)-JVS(1534)*X(125)-JVS(1535)*X(126)-JVS(1536)*X(127)-JVS(1537)*X(128)-JVS(1538)*X(129)&
             &-JVS(1539)*X(130)-JVS(1540)*X(131)-JVS(1541)*X(133)-JVS(1542)*X(134)-JVS(1543)*X(136)-JVS(1544)*X(137)&
             &-JVS(1545)*X(139)-JVS(1546)*X(140)-JVS(1547)*X(141)-JVS(1548)*X(143)-JVS(1549)*X(144)-JVS(1550)*X(145)&
             &-JVS(1551)*X(146)-JVS(1552)*X(147)-JVS(1553)*X(148)
  X(150) = X(150)-JVS(1564)*X(74)-JVS(1565)*X(77)-JVS(1566)*X(78)-JVS(1567)*X(85)-JVS(1568)*X(107)-JVS(1569)*X(110)&
             &-JVS(1570)*X(121)-JVS(1571)*X(122)-JVS(1572)*X(126)-JVS(1573)*X(128)-JVS(1574)*X(130)-JVS(1575)*X(133)&
             &-JVS(1576)*X(134)-JVS(1577)*X(136)-JVS(1578)*X(137)-JVS(1579)*X(139)-JVS(1580)*X(140)-JVS(1581)*X(141)&
             &-JVS(1582)*X(143)-JVS(1583)*X(144)-JVS(1584)*X(145)-JVS(1585)*X(147)-JVS(1586)*X(148)-JVS(1587)*X(149)
  X(151) = X(151)-JVS(1597)*X(39)-JVS(1598)*X(45)-JVS(1599)*X(47)-JVS(1600)*X(50)-JVS(1601)*X(59)-JVS(1602)*X(94)&
             &-JVS(1603)*X(95)-JVS(1604)*X(98)-JVS(1605)*X(102)-JVS(1606)*X(103)-JVS(1607)*X(104)-JVS(1608)*X(107)-JVS(1609)&
             &*X(110)-JVS(1610)*X(113)-JVS(1611)*X(114)-JVS(1612)*X(115)-JVS(1613)*X(116)-JVS(1614)*X(117)-JVS(1615)*X(118)&
             &-JVS(1616)*X(120)-JVS(1617)*X(121)-JVS(1618)*X(122)-JVS(1619)*X(123)-JVS(1620)*X(124)-JVS(1621)*X(125)&
             &-JVS(1622)*X(126)-JVS(1623)*X(127)-JVS(1624)*X(128)-JVS(1625)*X(129)-JVS(1626)*X(130)-JVS(1627)*X(131)&
             &-JVS(1628)*X(133)-JVS(1629)*X(134)-JVS(1630)*X(136)-JVS(1631)*X(137)-JVS(1632)*X(138)-JVS(1633)*X(139)&
             &-JVS(1634)*X(140)-JVS(1635)*X(141)-JVS(1636)*X(142)-JVS(1637)*X(143)-JVS(1638)*X(144)-JVS(1639)*X(145)&
             &-JVS(1640)*X(146)-JVS(1641)*X(147)-JVS(1642)*X(148)-JVS(1643)*X(149)-JVS(1644)*X(150)
  X(152) = X(152)-JVS(1653)*X(35)-JVS(1654)*X(60)-JVS(1655)*X(120)-JVS(1656)*X(133)-JVS(1657)*X(140)-JVS(1658)*X(144)&
             &-JVS(1659)*X(145)-JVS(1660)*X(146)-JVS(1661)*X(147)-JVS(1662)*X(148)-JVS(1663)*X(149)-JVS(1664)*X(150)&
             &-JVS(1665)*X(151)
  X(153) = X(153)-JVS(1673)*X(33)-JVS(1674)*X(34)-JVS(1675)*X(35)-JVS(1676)*X(38)-JVS(1677)*X(46)-JVS(1678)*X(47)&
             &-JVS(1679)*X(49)-JVS(1680)*X(53)-JVS(1681)*X(57)-JVS(1682)*X(58)-JVS(1683)*X(59)-JVS(1684)*X(61)-JVS(1685)&
             &*X(64)-JVS(1686)*X(67)-JVS(1687)*X(69)-JVS(1688)*X(73)-JVS(1689)*X(82)-JVS(1690)*X(84)-JVS(1691)*X(85)&
             &-JVS(1692)*X(86)-JVS(1693)*X(87)-JVS(1694)*X(89)-JVS(1695)*X(90)-JVS(1696)*X(91)-JVS(1697)*X(92)-JVS(1698)&
             &*X(93)-JVS(1699)*X(94)-JVS(1700)*X(95)-JVS(1701)*X(97)-JVS(1702)*X(99)-JVS(1703)*X(100)-JVS(1704)*X(101)&
             &-JVS(1705)*X(102)-JVS(1706)*X(103)-JVS(1707)*X(105)-JVS(1708)*X(106)-JVS(1709)*X(107)-JVS(1710)*X(108)&
             &-JVS(1711)*X(110)-JVS(1712)*X(111)-JVS(1713)*X(112)-JVS(1714)*X(113)-JVS(1715)*X(114)-JVS(1716)*X(115)&
             &-JVS(1717)*X(116)-JVS(1718)*X(117)-JVS(1719)*X(118)-JVS(1720)*X(119)-JVS(1721)*X(120)-JVS(1722)*X(121)&
             &-JVS(1723)*X(122)-JVS(1724)*X(123)-JVS(1725)*X(124)-JVS(1726)*X(125)-JVS(1727)*X(126)-JVS(1728)*X(127)&
             &-JVS(1729)*X(128)-JVS(1730)*X(129)-JVS(1731)*X(130)-JVS(1732)*X(131)-JVS(1733)*X(132)-JVS(1734)*X(133)&
             &-JVS(1735)*X(134)-JVS(1736)*X(135)-JVS(1737)*X(136)-JVS(1738)*X(137)-JVS(1739)*X(138)-JVS(1740)*X(139)&
             &-JVS(1741)*X(140)-JVS(1742)*X(141)-JVS(1743)*X(142)-JVS(1744)*X(143)-JVS(1745)*X(144)-JVS(1746)*X(145)&
             &-JVS(1747)*X(146)-JVS(1748)*X(147)-JVS(1749)*X(148)-JVS(1750)*X(149)-JVS(1751)*X(150)-JVS(1752)*X(151)&
             &-JVS(1753)*X(152)
  X(154) = X(154)-JVS(1760)*X(33)-JVS(1761)*X(43)-JVS(1762)*X(44)-JVS(1763)*X(47)-JVS(1764)*X(48)-JVS(1765)*X(49)&
             &-JVS(1766)*X(53)-JVS(1767)*X(59)-JVS(1768)*X(61)-JVS(1769)*X(86)-JVS(1770)*X(87)-JVS(1771)*X(89)-JVS(1772)&
             &*X(90)-JVS(1773)*X(92)-JVS(1774)*X(94)-JVS(1775)*X(95)-JVS(1776)*X(97)-JVS(1777)*X(99)-JVS(1778)*X(101)&
             &-JVS(1779)*X(102)-JVS(1780)*X(103)-JVS(1781)*X(105)-JVS(1782)*X(106)-JVS(1783)*X(110)-JVS(1784)*X(111)&
             &-JVS(1785)*X(112)-JVS(1786)*X(113)-JVS(1787)*X(114)-JVS(1788)*X(115)-JVS(1789)*X(118)-JVS(1790)*X(119)&
             &-JVS(1791)*X(120)-JVS(1792)*X(121)-JVS(1793)*X(122)-JVS(1794)*X(123)-JVS(1795)*X(124)-JVS(1796)*X(125)&
             &-JVS(1797)*X(126)-JVS(1798)*X(127)-JVS(1799)*X(128)-JVS(1800)*X(129)-JVS(1801)*X(130)-JVS(1802)*X(131)&
             &-JVS(1803)*X(132)-JVS(1804)*X(133)-JVS(1805)*X(134)-JVS(1806)*X(135)-JVS(1807)*X(136)-JVS(1808)*X(137)&
             &-JVS(1809)*X(138)-JVS(1810)*X(139)-JVS(1811)*X(140)-JVS(1812)*X(141)-JVS(1813)*X(142)-JVS(1814)*X(143)&
             &-JVS(1815)*X(144)-JVS(1816)*X(145)-JVS(1817)*X(146)-JVS(1818)*X(147)-JVS(1819)*X(148)-JVS(1820)*X(149)&
             &-JVS(1821)*X(150)-JVS(1822)*X(151)-JVS(1823)*X(152)-JVS(1824)*X(153)
  X(155) = X(155)-JVS(1830)*X(45)-JVS(1831)*X(59)-JVS(1832)*X(66)-JVS(1833)*X(68)-JVS(1834)*X(74)-JVS(1835)*X(76)&
             &-JVS(1836)*X(83)-JVS(1837)*X(87)-JVS(1838)*X(94)-JVS(1839)*X(95)-JVS(1840)*X(98)-JVS(1841)*X(102)-JVS(1842)&
             &*X(106)-JVS(1843)*X(108)-JVS(1844)*X(114)-JVS(1845)*X(115)-JVS(1846)*X(117)-JVS(1847)*X(118)-JVS(1848)*X(120)&
             &-JVS(1849)*X(121)-JVS(1850)*X(122)-JVS(1851)*X(123)-JVS(1852)*X(124)-JVS(1853)*X(125)-JVS(1854)*X(126)&
             &-JVS(1855)*X(127)-JVS(1856)*X(128)-JVS(1857)*X(129)-JVS(1858)*X(130)-JVS(1859)*X(131)-JVS(1860)*X(133)&
             &-JVS(1861)*X(134)-JVS(1862)*X(135)-JVS(1863)*X(136)-JVS(1864)*X(137)-JVS(1865)*X(138)-JVS(1866)*X(139)&
             &-JVS(1867)*X(140)-JVS(1868)*X(141)-JVS(1869)*X(142)-JVS(1870)*X(143)-JVS(1871)*X(144)-JVS(1872)*X(145)&
             &-JVS(1873)*X(146)-JVS(1874)*X(147)-JVS(1875)*X(148)-JVS(1876)*X(149)-JVS(1877)*X(150)-JVS(1878)*X(151)&
             &-JVS(1879)*X(152)-JVS(1880)*X(153)-JVS(1881)*X(154)
  X(156) = X(156)-JVS(1886)*X(85)-JVS(1887)*X(107)-JVS(1888)*X(110)-JVS(1889)*X(117)-JVS(1890)*X(130)-JVS(1891)*X(133)&
             &-JVS(1892)*X(139)-JVS(1893)*X(140)-JVS(1894)*X(141)-JVS(1895)*X(143)-JVS(1896)*X(145)-JVS(1897)*X(147)&
             &-JVS(1898)*X(148)-JVS(1899)*X(149)-JVS(1900)*X(150)-JVS(1901)*X(151)-JVS(1902)*X(152)-JVS(1903)*X(153)&
             &-JVS(1904)*X(154)-JVS(1905)*X(155)
  X(157) = X(157)-JVS(1909)*X(29)-JVS(1910)*X(49)-JVS(1911)*X(54)-JVS(1912)*X(114)-JVS(1913)*X(123)-JVS(1914)*X(125)&
             &-JVS(1915)*X(127)-JVS(1916)*X(129)-JVS(1917)*X(130)-JVS(1918)*X(131)-JVS(1919)*X(141)-JVS(1920)*X(143)&
             &-JVS(1921)*X(144)-JVS(1922)*X(145)-JVS(1923)*X(146)-JVS(1924)*X(147)-JVS(1925)*X(148)-JVS(1926)*X(149)&
             &-JVS(1927)*X(150)-JVS(1928)*X(151)-JVS(1929)*X(152)-JVS(1930)*X(153)-JVS(1931)*X(154)-JVS(1932)*X(155)&
             &-JVS(1933)*X(156)
  X(158) = X(158)-JVS(1936)*X(40)-JVS(1937)*X(47)-JVS(1938)*X(49)-JVS(1939)*X(50)-JVS(1940)*X(51)-JVS(1941)*X(52)&
             &-JVS(1942)*X(53)-JVS(1943)*X(54)-JVS(1944)*X(55)-JVS(1945)*X(56)-JVS(1946)*X(57)-JVS(1947)*X(58)-JVS(1948)&
             &*X(60)-JVS(1949)*X(62)-JVS(1950)*X(63)-JVS(1951)*X(64)-JVS(1952)*X(65)-JVS(1953)*X(67)-JVS(1954)*X(68)&
             &-JVS(1955)*X(69)-JVS(1956)*X(70)-JVS(1957)*X(71)-JVS(1958)*X(72)-JVS(1959)*X(73)-JVS(1960)*X(74)-JVS(1961)&
             &*X(75)-JVS(1962)*X(76)-JVS(1963)*X(77)-JVS(1964)*X(78)-JVS(1965)*X(79)-JVS(1966)*X(80)-JVS(1967)*X(81)&
             &-JVS(1968)*X(82)-JVS(1969)*X(84)-JVS(1970)*X(85)-JVS(1971)*X(86)-JVS(1972)*X(88)-JVS(1973)*X(89)-JVS(1974)&
             &*X(90)-JVS(1975)*X(91)-JVS(1976)*X(92)-JVS(1977)*X(93)-JVS(1978)*X(94)-JVS(1979)*X(95)-JVS(1980)*X(96)&
             &-JVS(1981)*X(97)-JVS(1982)*X(99)-JVS(1983)*X(100)-JVS(1984)*X(101)-JVS(1985)*X(102)-JVS(1986)*X(103)-JVS(1987)&
             &*X(106)-JVS(1988)*X(107)-JVS(1989)*X(108)-JVS(1990)*X(109)-JVS(1991)*X(110)-JVS(1992)*X(111)-JVS(1993)*X(112)&
             &-JVS(1994)*X(113)-JVS(1995)*X(114)-JVS(1996)*X(115)-JVS(1997)*X(117)-JVS(1998)*X(118)-JVS(1999)*X(119)&
             &-JVS(2000)*X(120)-JVS(2001)*X(121)-JVS(2002)*X(122)-JVS(2003)*X(123)-JVS(2004)*X(124)-JVS(2005)*X(125)&
             &-JVS(2006)*X(126)-JVS(2007)*X(127)-JVS(2008)*X(128)-JVS(2009)*X(129)-JVS(2010)*X(130)-JVS(2011)*X(131)&
             &-JVS(2012)*X(132)-JVS(2013)*X(133)-JVS(2014)*X(134)-JVS(2015)*X(135)-JVS(2016)*X(136)-JVS(2017)*X(137)&
             &-JVS(2018)*X(138)-JVS(2019)*X(139)-JVS(2020)*X(140)-JVS(2021)*X(141)-JVS(2022)*X(142)-JVS(2023)*X(143)&
             &-JVS(2024)*X(144)-JVS(2025)*X(145)-JVS(2026)*X(146)-JVS(2027)*X(147)-JVS(2028)*X(148)-JVS(2029)*X(149)&
             &-JVS(2030)*X(150)-JVS(2031)*X(151)-JVS(2032)*X(152)-JVS(2033)*X(153)-JVS(2034)*X(154)-JVS(2035)*X(155)&
             &-JVS(2036)*X(156)-JVS(2037)*X(157)
  X(158) = X(158)/JVS(2038)
  X(157) = (X(157)-JVS(1935)*X(158))/(JVS(1934))
  X(156) = (X(156)-JVS(1907)*X(157)-JVS(1908)*X(158))/(JVS(1906))
  X(155) = (X(155)-JVS(1883)*X(156)-JVS(1884)*X(157)-JVS(1885)*X(158))/(JVS(1882))
  X(154) = (X(154)-JVS(1826)*X(155)-JVS(1827)*X(156)-JVS(1828)*X(157)-JVS(1829)*X(158))/(JVS(1825))
  X(153) = (X(153)-JVS(1755)*X(154)-JVS(1756)*X(155)-JVS(1757)*X(156)-JVS(1758)*X(157)-JVS(1759)*X(158))/(JVS(1754))
  X(152) = (X(152)-JVS(1667)*X(153)-JVS(1668)*X(154)-JVS(1669)*X(155)-JVS(1670)*X(156)-JVS(1671)*X(157)-JVS(1672)&
             &*X(158))/(JVS(1666))
  X(151) = (X(151)-JVS(1646)*X(152)-JVS(1647)*X(153)-JVS(1648)*X(154)-JVS(1649)*X(155)-JVS(1650)*X(156)-JVS(1651)*X(157)&
             &-JVS(1652)*X(158))/(JVS(1645))
  X(150) = (X(150)-JVS(1589)*X(151)-JVS(1590)*X(152)-JVS(1591)*X(153)-JVS(1592)*X(154)-JVS(1593)*X(155)-JVS(1594)*X(156)&
             &-JVS(1595)*X(157)-JVS(1596)*X(158))/(JVS(1588))
  X(149) = (X(149)-JVS(1555)*X(150)-JVS(1556)*X(151)-JVS(1557)*X(152)-JVS(1558)*X(153)-JVS(1559)*X(154)-JVS(1560)*X(155)&
             &-JVS(1561)*X(156)-JVS(1562)*X(157)-JVS(1563)*X(158))/(JVS(1554))
  X(148) = (X(148)-JVS(1492)*X(149)-JVS(1493)*X(150)-JVS(1494)*X(151)-JVS(1495)*X(152)-JVS(1496)*X(153)-JVS(1497)*X(154)&
             &-JVS(1498)*X(155)-JVS(1499)*X(156)-JVS(1500)*X(157)-JVS(1501)*X(158))/(JVS(1491))
  X(147) = (X(147)-JVS(1374)*X(148)-JVS(1375)*X(149)-JVS(1376)*X(150)-JVS(1377)*X(151)-JVS(1378)*X(152)-JVS(1379)*X(153)&
             &-JVS(1380)*X(154)-JVS(1381)*X(155)-JVS(1382)*X(156)-JVS(1383)*X(157)-JVS(1384)*X(158))/(JVS(1373))
  X(146) = (X(146)-JVS(1311)*X(147)-JVS(1312)*X(148)-JVS(1313)*X(149)-JVS(1314)*X(150)-JVS(1315)*X(151)-JVS(1316)*X(152)&
             &-JVS(1317)*X(153)-JVS(1318)*X(154)-JVS(1319)*X(155)-JVS(1320)*X(156)-JVS(1321)*X(157)-JVS(1322)*X(158))&
             &/(JVS(1310))
  X(145) = (X(145)-JVS(1265)*X(147)-JVS(1266)*X(148)-JVS(1267)*X(149)-JVS(1268)*X(151)-JVS(1269)*X(152)-JVS(1270)*X(153)&
             &-JVS(1271)*X(154)-JVS(1272)*X(155)-JVS(1273)*X(158))/(JVS(1264))
  X(144) = (X(144)-JVS(1239)*X(145)-JVS(1240)*X(147)-JVS(1241)*X(148)-JVS(1242)*X(149)-JVS(1243)*X(151)-JVS(1244)*X(153)&
             &-JVS(1245)*X(154)-JVS(1246)*X(155)-JVS(1247)*X(158))/(JVS(1238))
  X(143) = (X(143)-JVS(1222)*X(145)-JVS(1223)*X(148)-JVS(1224)*X(149)-JVS(1225)*X(151)-JVS(1226)*X(154)-JVS(1227)*X(155)&
             &-JVS(1228)*X(156)-JVS(1229)*X(157)-JVS(1230)*X(158))/(JVS(1221))
  X(142) = (X(142)-JVS(1199)*X(143)-JVS(1200)*X(144)-JVS(1201)*X(145)-JVS(1202)*X(146)-JVS(1203)*X(147)-JVS(1204)*X(148)&
             &-JVS(1205)*X(149)-JVS(1206)*X(150)-JVS(1207)*X(151)-JVS(1208)*X(152)-JVS(1209)*X(153)-JVS(1210)*X(154)&
             &-JVS(1211)*X(155)-JVS(1212)*X(156)-JVS(1213)*X(157)-JVS(1214)*X(158))/(JVS(1198))
  X(141) = (X(141)-JVS(1173)*X(143)-JVS(1174)*X(145)-JVS(1175)*X(148)-JVS(1176)*X(149)-JVS(1177)*X(151)-JVS(1178)*X(154)&
             &-JVS(1179)*X(155)-JVS(1180)*X(157)-JVS(1181)*X(158))/(JVS(1172))
  X(140) = (X(140)-JVS(1157)*X(145)-JVS(1158)*X(148)-JVS(1159)*X(149)-JVS(1160)*X(151)-JVS(1161)*X(154)-JVS(1162)*X(155)&
             &-JVS(1163)*X(158))/(JVS(1156))
  X(139) = (X(139)-JVS(1141)*X(140)-JVS(1142)*X(145)-JVS(1143)*X(147)-JVS(1144)*X(148)-JVS(1145)*X(149)-JVS(1146)*X(151)&
             &-JVS(1147)*X(153)-JVS(1148)*X(154)-JVS(1149)*X(155)-JVS(1150)*X(158))/(JVS(1140))
  X(138) = (X(138)-JVS(1118)*X(139)-JVS(1119)*X(140)-JVS(1120)*X(141)-JVS(1121)*X(144)-JVS(1122)*X(145)-JVS(1123)*X(147)&
             &-JVS(1124)*X(148)-JVS(1125)*X(149)-JVS(1126)*X(150)-JVS(1127)*X(151)-JVS(1128)*X(153)-JVS(1129)*X(154)&
             &-JVS(1130)*X(155)-JVS(1131)*X(156)-JVS(1132)*X(157)-JVS(1133)*X(158))/(JVS(1117))
  X(137) = (X(137)-JVS(1082)*X(145)-JVS(1083)*X(148)-JVS(1084)*X(149)-JVS(1085)*X(151)-JVS(1086)*X(154)-JVS(1087)*X(155)&
             &-JVS(1088)*X(158))/(JVS(1081))
  X(136) = (X(136)-JVS(1068)*X(137)-JVS(1069)*X(140)-JVS(1070)*X(145)-JVS(1071)*X(148)-JVS(1072)*X(149)-JVS(1073)*X(151)&
             &-JVS(1074)*X(154)-JVS(1075)*X(155)-JVS(1076)*X(158))/(JVS(1067))
  X(135) = (X(135)-JVS(1043)*X(136)-JVS(1044)*X(137)-JVS(1045)*X(138)-JVS(1046)*X(139)-JVS(1047)*X(140)-JVS(1048)*X(141)&
             &-JVS(1049)*X(144)-JVS(1050)*X(145)-JVS(1051)*X(147)-JVS(1052)*X(148)-JVS(1053)*X(149)-JVS(1054)*X(150)&
             &-JVS(1055)*X(151)-JVS(1056)*X(153)-JVS(1057)*X(154)-JVS(1058)*X(155)-JVS(1059)*X(156)-JVS(1060)*X(157)&
             &-JVS(1061)*X(158))/(JVS(1042))
  X(134) = (X(134)-JVS(1002)*X(139)-JVS(1003)*X(145)-JVS(1004)*X(147)-JVS(1005)*X(148)-JVS(1006)*X(149)-JVS(1007)*X(151)&
             &-JVS(1008)*X(153)-JVS(1009)*X(154)-JVS(1010)*X(155)-JVS(1011)*X(158))/(JVS(1001))
  X(133) = (X(133)-JVS(991)*X(140)-JVS(992)*X(145)-JVS(993)*X(148)-JVS(994)*X(149)-JVS(995)*X(151)-JVS(996)*X(154)&
             &-JVS(997)*X(155))/(JVS(990))
  X(132) = (X(132)-JVS(965)*X(133)-JVS(966)*X(134)-JVS(967)*X(136)-JVS(968)*X(137)-JVS(969)*X(138)-JVS(970)*X(139)&
             &-JVS(971)*X(140)-JVS(972)*X(141)-JVS(973)*X(142)-JVS(974)*X(143)-JVS(975)*X(144)-JVS(976)*X(145)-JVS(977)&
             &*X(146)-JVS(978)*X(147)-JVS(979)*X(148)-JVS(980)*X(149)-JVS(981)*X(150)-JVS(982)*X(151)-JVS(983)*X(152)&
             &-JVS(984)*X(153)-JVS(985)*X(154)-JVS(986)*X(155)-JVS(987)*X(156)-JVS(988)*X(157)-JVS(989)*X(158))/(JVS(964))
  X(131) = (X(131)-JVS(903)*X(141)-JVS(904)*X(146)-JVS(905)*X(148)-JVS(906)*X(149)-JVS(907)*X(150)-JVS(908)*X(151)&
             &-JVS(909)*X(152)-JVS(910)*X(154)-JVS(911)*X(155)-JVS(912)*X(156)-JVS(913)*X(157)-JVS(914)*X(158))/(JVS(902))
  X(130) = (X(130)-JVS(892)*X(148)-JVS(893)*X(149)-JVS(894)*X(150)-JVS(895)*X(151)-JVS(896)*X(154)-JVS(897)*X(155)&
             &-JVS(898)*X(157)-JVS(899)*X(158))/(JVS(891))
  X(129) = (X(129)-JVS(882)*X(144)-JVS(883)*X(145)-JVS(884)*X(148)-JVS(885)*X(149)-JVS(886)*X(151)-JVS(887)*X(154)&
             &-JVS(888)*X(155)-JVS(889)*X(157)-JVS(890)*X(158))/(JVS(881))
  X(128) = (X(128)-JVS(870)*X(139)-JVS(871)*X(145)-JVS(872)*X(148)-JVS(873)*X(149)-JVS(874)*X(151)-JVS(875)*X(153)&
             &-JVS(876)*X(154)-JVS(877)*X(155)-JVS(878)*X(158))/(JVS(869))
  X(127) = (X(127)-JVS(857)*X(144)-JVS(858)*X(145)-JVS(859)*X(148)-JVS(860)*X(149)-JVS(861)*X(151)-JVS(862)*X(154)&
             &-JVS(863)*X(155)-JVS(864)*X(157)-JVS(865)*X(158))/(JVS(856))
  X(126) = (X(126)-JVS(847)*X(136)-JVS(848)*X(137)-JVS(849)*X(148)-JVS(850)*X(149)-JVS(851)*X(151)-JVS(852)*X(155)&
             &-JVS(853)*X(158))/(JVS(846))
  X(125) = (X(125)-JVS(834)*X(130)-JVS(835)*X(141)-JVS(836)*X(148)-JVS(837)*X(149)-JVS(838)*X(151)-JVS(839)*X(155)&
             &-JVS(840)*X(156)-JVS(841)*X(157)-JVS(842)*X(158))/(JVS(833))
  X(124) = (X(124)-JVS(824)*X(137)-JVS(825)*X(140)-JVS(826)*X(145)-JVS(827)*X(148)-JVS(828)*X(149)-JVS(829)*X(151))&
             &/(JVS(823))
  X(123) = (X(123)-JVS(815)*X(141)-JVS(816)*X(148)-JVS(817)*X(149)-JVS(818)*X(151)-JVS(819)*X(155)-JVS(820)*X(156)&
             &-JVS(821)*X(157)-JVS(822)*X(158))/(JVS(814))
  X(122) = (X(122)-JVS(804)*X(144)-JVS(805)*X(145)-JVS(806)*X(148)-JVS(807)*X(149)-JVS(808)*X(151)-JVS(809)*X(154)&
             &-JVS(810)*X(155)-JVS(811)*X(158))/(JVS(803))
  X(121) = (X(121)-JVS(793)*X(128)-JVS(794)*X(139)-JVS(795)*X(148)-JVS(796)*X(149)-JVS(797)*X(151)-JVS(798)*X(154)&
             &-JVS(799)*X(155)-JVS(800)*X(158))/(JVS(792))
  X(120) = (X(120)-JVS(784)*X(133)-JVS(785)*X(148)-JVS(786)*X(149)-JVS(787)*X(153)-JVS(788)*X(154)-JVS(789)*X(158))&
             &/(JVS(783))
  X(119) = (X(119)-JVS(769)*X(122)-JVS(770)*X(124)-JVS(771)*X(126)-JVS(772)*X(133)-JVS(773)*X(136)-JVS(774)*X(137)&
             &-JVS(775)*X(145)-JVS(776)*X(147)-JVS(777)*X(148)-JVS(778)*X(149)-JVS(779)*X(151)-JVS(780)*X(153)-JVS(781)&
             &*X(155)-JVS(782)*X(158))/(JVS(768))
  X(118) = (X(118)-JVS(753)*X(124)-JVS(754)*X(137)-JVS(755)*X(145)-JVS(756)*X(148)-JVS(757)*X(149)-JVS(758)*X(158))&
             &/(JVS(752))
  X(117) = (X(117)-JVS(743)*X(139)-JVS(744)*X(149)-JVS(745)*X(151)-JVS(746)*X(154)-JVS(747)*X(155)-JVS(748)*X(158))&
             &/(JVS(742))
  X(116) = (X(116)-JVS(728)*X(117)-JVS(729)*X(118)-JVS(730)*X(120)-JVS(731)*X(124)-JVS(732)*X(129)-JVS(733)*X(133)&
             &-JVS(734)*X(137)-JVS(735)*X(145)-JVS(736)*X(148)-JVS(737)*X(149)-JVS(738)*X(151)-JVS(739)*X(154)-JVS(740)&
             &*X(155)-JVS(741)*X(158))/(JVS(727))
  X(115) = (X(115)-JVS(717)*X(118)-JVS(718)*X(124)-JVS(719)*X(148)-JVS(720)*X(149)-JVS(721)*X(158))/(JVS(716))
  X(114) = (X(114)-JVS(707)*X(141)-JVS(708)*X(148)-JVS(709)*X(149)-JVS(710)*X(151)-JVS(711)*X(155)-JVS(712)*X(156)&
             &-JVS(713)*X(157)-JVS(714)*X(158))/(JVS(706))
  X(113) = (X(113)-JVS(696)*X(115)-JVS(697)*X(118)-JVS(698)*X(134)-JVS(699)*X(137)-JVS(700)*X(145)-JVS(701)*X(148)&
             &-JVS(702)*X(149)-JVS(703)*X(158))/(JVS(695))
  X(112) = (X(112)-JVS(676)*X(114)-JVS(677)*X(123)-JVS(678)*X(125)-JVS(679)*X(127)-JVS(680)*X(129)-JVS(681)*X(130)&
             &-JVS(682)*X(131)-JVS(683)*X(141)-JVS(684)*X(143)-JVS(685)*X(148)-JVS(686)*X(149)-JVS(687)*X(151)-JVS(688)&
             &*X(152)-JVS(689)*X(153)-JVS(690)*X(154)-JVS(691)*X(155)-JVS(692)*X(157)-JVS(693)*X(158))/(JVS(675))
  X(111) = (X(111)-JVS(660)*X(119)-JVS(661)*X(124)-JVS(662)*X(126)-JVS(663)*X(133)-JVS(664)*X(137)-JVS(665)*X(145)&
             &-JVS(666)*X(148)-JVS(667)*X(149)-JVS(668)*X(151)-JVS(669)*X(154)-JVS(670)*X(155)-JVS(671)*X(158))/(JVS(659))
  X(110) = (X(110)-JVS(643)*X(133)-JVS(644)*X(149)-JVS(645)*X(151)-JVS(646)*X(154)-JVS(647)*X(158))/(JVS(642))
  X(109) = (X(109)-JVS(619)*X(110)-JVS(620)*X(114)-JVS(621)*X(119)-JVS(622)*X(122)-JVS(623)*X(123)-JVS(624)*X(124)&
             &-JVS(625)*X(125)-JVS(626)*X(126)-JVS(627)*X(127)-JVS(628)*X(129)-JVS(629)*X(130)-JVS(630)*X(131)-JVS(631)&
             &*X(133)-JVS(632)*X(137)-JVS(633)*X(140)-JVS(634)*X(141)-JVS(635)*X(143)-JVS(636)*X(145)-JVS(637)*X(148)&
             &-JVS(638)*X(149)-JVS(639)*X(151)-JVS(640)*X(157)-JVS(641)*X(158))/(JVS(618))
  X(108) = (X(108)-JVS(611)*X(124)-JVS(612)*X(137)-JVS(613)*X(145)-JVS(614)*X(148)-JVS(615)*X(149)-JVS(616)*X(158))&
             &/(JVS(610))
  X(107) = (X(107)-JVS(598)*X(133)-JVS(599)*X(148)-JVS(600)*X(149)-JVS(601)*X(151)-JVS(602)*X(158))/(JVS(597))
  X(106) = (X(106)-JVS(589)*X(115)-JVS(590)*X(118)-JVS(591)*X(122)-JVS(592)*X(137)-JVS(593)*X(145)-JVS(594)*X(148)&
             &-JVS(595)*X(149)-JVS(596)*X(158))/(JVS(588))
  X(105) = (X(105)-JVS(567)*X(111)-JVS(568)*X(112)-JVS(569)*X(121)-JVS(570)*X(124)-JVS(571)*X(126)-JVS(572)*X(132)&
             &-JVS(573)*X(133)-JVS(574)*X(135)-JVS(575)*X(137)-JVS(576)*X(139)-JVS(577)*X(142)-JVS(578)*X(145)-JVS(579)&
             &*X(146)-JVS(580)*X(148)-JVS(581)*X(149)-JVS(582)*X(150)-JVS(583)*X(153)-JVS(584)*X(154)-JVS(585)*X(155)&
             &-JVS(586)*X(158))/(JVS(566))
  X(104) = (X(104)-JVS(532)*X(113)-JVS(533)*X(114)-JVS(534)*X(117)-JVS(535)*X(121)-JVS(536)*X(122)-JVS(537)*X(123)&
             &-JVS(538)*X(125)-JVS(539)*X(126)-JVS(540)*X(127)-JVS(541)*X(129)-JVS(542)*X(130)-JVS(543)*X(131)-JVS(544)&
             &*X(134)-JVS(545)*X(137)-JVS(546)*X(138)-JVS(547)*X(140)-JVS(548)*X(141)-JVS(549)*X(143)-JVS(550)*X(144)&
             &-JVS(551)*X(145)-JVS(552)*X(147)-JVS(553)*X(148)-JVS(554)*X(149)-JVS(555)*X(151)-JVS(556)*X(153)-JVS(557)&
             &*X(154)-JVS(558)*X(155)-JVS(559)*X(157)-JVS(560)*X(158))/(JVS(531))
  X(103) = (X(103)-JVS(524)*X(144)-JVS(525)*X(145)-JVS(526)*X(148)-JVS(527)*X(154))/(JVS(523))
  X(102) = (X(102)-JVS(519)*X(145)-JVS(520)*X(148)-JVS(521)*X(154))/(JVS(518))
  X(101) = (X(101)-JVS(510)*X(102)-JVS(511)*X(103)-JVS(512)*X(139)-JVS(513)*X(144)-JVS(514)*X(145)-JVS(515)*X(147)&
             &-JVS(516)*X(149)-JVS(517)*X(153))/(JVS(509))
  X(100) = (X(100)-JVS(505)*X(137)-JVS(506)*X(145)-JVS(507)*X(148)-JVS(508)*X(149))/(JVS(504))
  X(99) = (X(99)-JVS(499)*X(102)-JVS(500)*X(145)-JVS(501)*X(147)-JVS(502)*X(149)-JVS(503)*X(153))/(JVS(498))
  X(98) = (X(98)-JVS(489)*X(123)-JVS(490)*X(141)-JVS(491)*X(148)-JVS(492)*X(149)-JVS(493)*X(151)-JVS(494)*X(155)&
            &-JVS(495)*X(156)-JVS(496)*X(157)-JVS(497)*X(158))/(JVS(488))
  X(97) = (X(97)-JVS(482)*X(113)-JVS(483)*X(148)-JVS(484)*X(149)-JVS(485)*X(153)-JVS(486)*X(158))/(JVS(481))
  X(96) = (X(96)-JVS(465)*X(114)-JVS(466)*X(121)-JVS(467)*X(122)-JVS(468)*X(123)-JVS(469)*X(126)-JVS(470)*X(127)&
            &-JVS(471)*X(129)-JVS(472)*X(130)-JVS(473)*X(134)-JVS(474)*X(137)-JVS(475)*X(141)-JVS(476)*X(143)-JVS(477)&
            &*X(148)-JVS(478)*X(151)-JVS(479)*X(157))/(JVS(464))
  X(95) = (X(95)-JVS(459)*X(144)-JVS(460)*X(145)-JVS(461)*X(147)-JVS(462)*X(149)-JVS(463)*X(153))/(JVS(458))
  X(94) = (X(94)-JVS(453)*X(120)-JVS(454)*X(139)-JVS(455)*X(148)-JVS(456)*X(153)-JVS(457)*X(154))/(JVS(452))
  X(93) = (X(93)-JVS(447)*X(137)-JVS(448)*X(149)-JVS(449)*X(155)-JVS(450)*X(158))/(JVS(446))
  X(92) = (X(92)-JVS(440)*X(136)-JVS(441)*X(139)-JVS(442)*X(145)-JVS(443)*X(147)-JVS(444)*X(149)-JVS(445)*X(153))&
            &/(JVS(439))
  X(91) = (X(91)-JVS(433)*X(126)-JVS(434)*X(145)-JVS(435)*X(148)-JVS(436)*X(149)-JVS(437)*X(155)-JVS(438)*X(158))&
            &/(JVS(432))
  X(90) = (X(90)-JVS(426)*X(136)-JVS(427)*X(145)-JVS(428)*X(147)-JVS(429)*X(149)-JVS(430)*X(153))/(JVS(425))
  X(89) = (X(89)-JVS(420)*X(103)-JVS(421)*X(145)-JVS(422)*X(147)-JVS(423)*X(149)-JVS(424)*X(153))/(JVS(419))
  X(88) = (X(88)-JVS(407)*X(114)-JVS(408)*X(123)-JVS(409)*X(125)-JVS(410)*X(127)-JVS(411)*X(129)-JVS(412)*X(130)&
            &-JVS(413)*X(131)-JVS(414)*X(141)-JVS(415)*X(143)-JVS(416)*X(148)-JVS(417)*X(151)-JVS(418)*X(157))/(JVS(406))
  X(87) = (X(87)-JVS(402)*X(128)-JVS(403)*X(145)-JVS(404)*X(148)-JVS(405)*X(153))/(JVS(401))
  X(86) = (X(86)-JVS(396)*X(102)-JVS(397)*X(145)-JVS(398)*X(147)-JVS(399)*X(149)-JVS(400)*X(153))/(JVS(395))
  X(85) = (X(85)-JVS(390)*X(107)-JVS(391)*X(110)-JVS(392)*X(140)-JVS(393)*X(148)-JVS(394)*X(158))/(JVS(389))
  X(84) = (X(84)-JVS(383)*X(115)-JVS(384)*X(124)-JVS(385)*X(145)-JVS(386)*X(148)-JVS(387)*X(149)-JVS(388)*X(158))&
            &/(JVS(382))
  X(83) = (X(83)-JVS(376)*X(117)-JVS(377)*X(128)-JVS(378)*X(139)-JVS(379)*X(148)-JVS(380)*X(154)-JVS(381)*X(158))&
            &/(JVS(375))
  X(82) = (X(82)-JVS(371)*X(115)-JVS(372)*X(118)-JVS(373)*X(148)-JVS(374)*X(158))/(JVS(370))
  X(81) = (X(81)-JVS(363)*X(91)-JVS(364)*X(93)-JVS(365)*X(141)-JVS(366)*X(148)-JVS(367)*X(149)-JVS(368)*X(154)-JVS(369)&
            &*X(158))/(JVS(362))
  X(80) = (X(80)-JVS(356)*X(137)-JVS(357)*X(148)-JVS(358)*X(158))/(JVS(355))
  X(79) = (X(79)-JVS(352)*X(137)-JVS(353)*X(148)-JVS(354)*X(158))/(JVS(351))
  X(78) = (X(78)-JVS(346)*X(126)-JVS(347)*X(148)-JVS(348)*X(149)-JVS(349)*X(155)-JVS(350)*X(158))/(JVS(345))
  X(77) = (X(77)-JVS(339)*X(126)-JVS(340)*X(145)-JVS(341)*X(148)-JVS(342)*X(149)-JVS(343)*X(155))/(JVS(338))
  X(76) = (X(76)-JVS(334)*X(108)-JVS(335)*X(148)-JVS(336)*X(149)-JVS(337)*X(158))/(JVS(333))
  X(75) = (X(75)-JVS(330)*X(126)-JVS(331)*X(148)-JVS(332)*X(158))/(JVS(329))
  X(74) = (X(74)-JVS(326)*X(122)-JVS(327)*X(148)-JVS(328)*X(158))/(JVS(325))
  X(73) = (X(73)-JVS(321)*X(137)-JVS(322)*X(148)-JVS(323)*X(149)-JVS(324)*X(158))/(JVS(320))
  X(72) = (X(72)-JVS(316)*X(137)-JVS(317)*X(148)-JVS(318)*X(158))/(JVS(315))
  X(71) = (X(71)-JVS(303)*X(97)-JVS(304)*X(100)-JVS(305)*X(101)-JVS(306)*X(106)-JVS(307)*X(108)-JVS(308)*X(115)-JVS(309)&
            &*X(119)-JVS(310)*X(138)-JVS(311)*X(145)-JVS(312)*X(148)-JVS(313)*X(149)-JVS(314)*X(158))/(JVS(302))
  X(70) = (X(70)-JVS(298)*X(99)-JVS(299)*X(134)-JVS(300)*X(148)-JVS(301)*X(158))/(JVS(297))
  X(69) = (X(69)-JVS(294)*X(137)-JVS(295)*X(149)-JVS(296)*X(158))/(JVS(293))
  X(68) = (X(68)-JVS(291)*X(137)-JVS(292)*X(148))/(JVS(290))
  X(67) = (X(67)-JVS(286)*X(148)-JVS(287)*X(149)-JVS(288)*X(154)-JVS(289)*X(158))/(JVS(285))
  X(66) = (X(66)-JVS(280)*X(125)-JVS(281)*X(130)-JVS(282)*X(148)-JVS(283)*X(158))/(JVS(279))
  X(65) = (X(65)-JVS(273)*X(124)-JVS(274)*X(131)-JVS(275)*X(145)-JVS(276)*X(148)-JVS(277)*X(151)-JVS(278)*X(157))&
            &/(JVS(272))
  X(64) = (X(64)-JVS(269)*X(129)-JVS(270)*X(148)-JVS(271)*X(158))/(JVS(268))
  X(63) = (X(63)-JVS(265)*X(127)-JVS(266)*X(148)-JVS(267)*X(158))/(JVS(264))
  X(62) = (X(62)-JVS(255)*X(86)-JVS(256)*X(89)-JVS(257)*X(90)-JVS(258)*X(92)-JVS(259)*X(95)-JVS(260)*X(99)-JVS(261)&
            &*X(101)-JVS(262)*X(148)-JVS(263)*X(158))/(JVS(254))
  X(61) = (X(61)-JVS(250)*X(145)-JVS(251)*X(149)-JVS(252)*X(153)-JVS(253)*X(154))/(JVS(249))
  X(60) = (X(60)-JVS(244)*X(120)-JVS(245)*X(148)-JVS(246)*X(152)-JVS(247)*X(158))/(JVS(243))
  X(59) = (X(59)-JVS(239)*X(94)-JVS(240)*X(148)-JVS(241)*X(153)-JVS(242)*X(155))/(JVS(238))
  X(58) = (X(58)-JVS(235)*X(148)-JVS(236)*X(149)-JVS(237)*X(158))/(JVS(234))
  X(57) = (X(57)-JVS(230)*X(148)-JVS(231)*X(149)-JVS(232)*X(158))/(JVS(229))
  X(56) = (X(56)-JVS(221)*X(75)-JVS(222)*X(111)-JVS(223)*X(112)-JVS(224)*X(126)-JVS(225)*X(132)-JVS(226)*X(148)-JVS(227)&
            &*X(151))/(JVS(220))
  X(55) = (X(55)-JVS(217)*X(131)-JVS(218)*X(148)-JVS(219)*X(158))/(JVS(216))
  X(54) = (X(54)-JVS(213)*X(148)-JVS(214)*X(157)-JVS(215)*X(158))/(JVS(212))
  X(53) = (X(53)-JVS(209)*X(148)-JVS(210)*X(153)-JVS(211)*X(158))/(JVS(208))
  X(52) = (X(52)-JVS(205)*X(123)-JVS(206)*X(148)-JVS(207)*X(158))/(JVS(204))
  X(51) = (X(51)-JVS(201)*X(114)-JVS(202)*X(148)-JVS(203)*X(158))/(JVS(200))
  X(50) = (X(50)-JVS(197)*X(148)-JVS(198)*X(151)-JVS(199)*X(158))/(JVS(196))
  X(49) = (X(49)-JVS(194)*X(153)-JVS(195)*X(157))/(JVS(193))
  X(48) = (X(48)-JVS(191)*X(148)-JVS(192)*X(154))/(JVS(190))
  X(47) = (X(47)-JVS(188)*X(151)-JVS(189)*X(153))/(JVS(187))
  X(46) = (X(46)-JVS(182)*X(94)-JVS(183)*X(139)-JVS(184)*X(148)-JVS(185)*X(153)-JVS(186)*X(154))/(JVS(181))
  X(45) = (X(45)-JVS(178)*X(148)-JVS(179)*X(155)-JVS(180)*X(158))/(JVS(177))
  X(44) = (X(44)-JVS(175)*X(148)-JVS(176)*X(154))/(JVS(174))
  X(43) = (X(43)-JVS(172)*X(148)-JVS(173)*X(154))/(JVS(171))
  X(42) = (X(42)-JVS(167)*X(72)-JVS(168)*X(79)-JVS(169)*X(100)-JVS(170)*X(148))/(JVS(166))
  X(41) = (X(41)-JVS(162)*X(72)-JVS(163)*X(79)-JVS(164)*X(100)-JVS(165)*X(148))/(JVS(161))
  X(40) = (X(40)-JVS(158)*X(112)-JVS(159)*X(148)-JVS(160)*X(154))/(JVS(157))
  X(39) = (X(39)-JVS(154)*X(103)-JVS(155)*X(145)-JVS(156)*X(148))/(JVS(153))
  X(38) = (X(38)-JVS(151)*X(148)-JVS(152)*X(149))/(JVS(150))
  X(37) = (X(37)-JVS(147)*X(80)-JVS(148)*X(124)-JVS(149)*X(148))/(JVS(146))
  X(36) = (X(36)-JVS(145)*X(148))/(JVS(144))
  X(35) = (X(35)-JVS(142)*X(152)-JVS(143)*X(153))/(JVS(141))
  X(34) = (X(34)-JVS(139)*X(97)-JVS(140)*X(153))/(JVS(138))
  X(33) = (X(33)-JVS(136)*X(153)-JVS(137)*X(154))/(JVS(135))
  X(32) = (X(32)-JVS(134)*X(69))/(JVS(133))
  X(31) = (X(31)-JVS(132)*X(148))/(JVS(131))
  X(30) = (X(30)-JVS(130)*X(148))/(JVS(129))
  X(29) = (X(29)-JVS(128)*X(148))/(JVS(127))
  X(28) = (X(28)-JVS(126)*X(145))/(JVS(125))
  X(27) = (X(27)-JVS(115)*X(36)-JVS(116)*X(48)-JVS(117)*X(66)-JVS(118)*X(116)-JVS(119)*X(125)-JVS(120)*X(138)-JVS(121)&
            &*X(148)-JVS(122)*X(151)-JVS(123)*X(155)-JVS(124)*X(157))/(JVS(114))
  X(26) = (X(26)-JVS(109)*X(30)-JVS(110)*X(36)-JVS(111)*X(48)-JVS(112)*X(132)-JVS(113)*X(148))/(JVS(108))
  X(25) = (X(25)-JVS(103)*X(30)-JVS(104)*X(36)-JVS(105)*X(48)-JVS(106)*X(119)-JVS(107)*X(148))/(JVS(102))
  X(24) = (X(24)-JVS(100)*X(48)-JVS(101)*X(148))/(JVS(99))
  X(23) = (X(23)-JVS(97)*X(36)-JVS(98)*X(148))/(JVS(96))
  X(22) = (X(22)-JVS(94)*X(30)-JVS(95)*X(148))/(JVS(93))
  X(21) = (X(21)-JVS(91)*X(67)-JVS(92)*X(149))/(JVS(90))
  X(20) = (X(20)-JVS(88)*X(67)-JVS(89)*X(158))/(JVS(87))
  X(19) = (X(19)-JVS(85)*X(58)-JVS(86)*X(149))/(JVS(84))
  X(18) = (X(18)-JVS(82)*X(58)-JVS(83)*X(158))/(JVS(81))
  X(17) = (X(17)-JVS(79)*X(102)-JVS(80)*X(154))/(JVS(78))
  X(16) = (X(16)-JVS(76)*X(102)-JVS(77)*X(148))/(JVS(75))
  X(15) = (X(15)-JVS(73)*X(57)-JVS(74)*X(149))/(JVS(72))
  X(14) = (X(14)-JVS(70)*X(57)-JVS(71)*X(158))/(JVS(69))
  X(13) = (X(13)-JVS(61)*X(69)-JVS(62)*X(73)-JVS(63)*X(120)-JVS(64)*X(128)-JVS(65)*X(151)-JVS(66)*X(152)-JVS(67)*X(157)&
            &-JVS(68)*X(158))/(JVS(60))
  X(12) = X(12)/JVS(59)
  X(11) = X(11)/JVS(58)
  X(10) = (X(10)-JVS(56)*X(106)-JVS(57)*X(148))/(JVS(55))
  X(9) = X(9)/JVS(54)
  X(8) = X(8)/JVS(53)
  X(7) = X(7)/JVS(52)
  X(6) = (X(6)-JVS(48)*X(72)-JVS(49)*X(79)-JVS(50)*X(80)-JVS(51)*X(148))/(JVS(47))
  X(5) = (X(5)-JVS(39)*X(107)-JVS(40)*X(110)-JVS(41)*X(120)-JVS(42)*X(149)-JVS(43)*X(151)-JVS(44)*X(153)-JVS(45)*X(154)&
           &-JVS(46)*X(158))/(JVS(38))
  X(4) = (X(4)-JVS(36)*X(94)-JVS(37)*X(148))/(JVS(35))
  X(3) = (X(3)-JVS(32)*X(115)-JVS(33)*X(118)-JVS(34)*X(149))/(JVS(31))
  X(2) = (X(2)-JVS(3)*X(40)-JVS(4)*X(48)-JVS(5)*X(68)-JVS(6)*X(70)-JVS(7)*X(71)-JVS(8)*X(77)-JVS(9)*X(84)-JVS(10)*X(91)&
           &-JVS(11)*X(94)-JVS(12)*X(97)-JVS(13)*X(100)-JVS(14)*X(104)-JVS(15)*X(108)-JVS(16)*X(117)-JVS(17)*X(119)-JVS(18)&
           &*X(121)-JVS(19)*X(124)-JVS(20)*X(128)-JVS(21)*X(137)-JVS(22)*X(138)-JVS(23)*X(145)-JVS(24)*X(147)-JVS(25)*X(148)&
           &-JVS(26)*X(149)-JVS(27)*X(151)-JVS(28)*X(154)-JVS(29)*X(155)-JVS(30)*X(158))/(JVS(2))
  X(1) = X(1)/JVS(1)
      
END SUBROUTINE KppSolve

! End of KppSolve function
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~


! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
! 
! KppSolveTR - sparse, transposed back substitution
!   Arguments :
!      JVS       - sparse Jacobian of variables
!      X         - Vector for variables
!      XX        - Vector for output variables
! 
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~

SUBROUTINE KppSolveTR ( JVS, X, XX )

! JVS - sparse Jacobian of variables
  REAL(kind=dp) :: JVS(LU_NONZERO)
! X - Vector for variables
  REAL(kind=dp) :: X(NVAR)
! XX - Vector for output variables
  REAL(kind=dp) :: XX(NVAR)

  XX(1) = X(1)/JVS(1)
  XX(2) = X(2)/JVS(2)
  XX(3) = X(3)/JVS(31)
  XX(4) = X(4)/JVS(35)
  XX(5) = X(5)/JVS(38)
  XX(6) = X(6)/JVS(47)
  XX(7) = X(7)/JVS(52)
  XX(8) = X(8)/JVS(53)
  XX(9) = X(9)/JVS(54)
  XX(10) = X(10)/JVS(55)
  XX(11) = X(11)/JVS(58)
  XX(12) = X(12)/JVS(59)
  XX(13) = X(13)/JVS(60)
  XX(14) = X(14)/JVS(69)
  XX(15) = X(15)/JVS(72)
  XX(16) = X(16)/JVS(75)
  XX(17) = X(17)/JVS(78)
  XX(18) = X(18)/JVS(81)
  XX(19) = X(19)/JVS(84)
  XX(20) = X(20)/JVS(87)
  XX(21) = X(21)/JVS(90)
  XX(22) = X(22)/JVS(93)
  XX(23) = X(23)/JVS(96)
  XX(24) = X(24)/JVS(99)
  XX(25) = X(25)/JVS(102)
  XX(26) = X(26)/JVS(108)
  XX(27) = X(27)/JVS(114)
  XX(28) = X(28)/JVS(125)
  XX(29) = X(29)/JVS(127)
  XX(30) = (X(30)-JVS(94)*XX(22)-JVS(103)*XX(25)-JVS(109)*XX(26))/(JVS(129))
  XX(31) = X(31)/JVS(131)
  XX(32) = X(32)/JVS(133)
  XX(33) = X(33)/JVS(135)
  XX(34) = X(34)/JVS(138)
  XX(35) = X(35)/JVS(141)
  XX(36) = (X(36)-JVS(97)*XX(23)-JVS(104)*XX(25)-JVS(110)*XX(26)-JVS(115)*XX(27))/(JVS(144))
  XX(37) = X(37)/JVS(146)
  XX(38) = X(38)/JVS(150)
  XX(39) = X(39)/JVS(153)
  XX(40) = (X(40)-JVS(3)*XX(2))/(JVS(157))
  XX(41) = X(41)/JVS(161)
  XX(42) = X(42)/JVS(166)
  XX(43) = X(43)/JVS(171)
  XX(44) = X(44)/JVS(174)
  XX(45) = X(45)/JVS(177)
  XX(46) = X(46)/JVS(181)
  XX(47) = X(47)/JVS(187)
  XX(48) = (X(48)-JVS(4)*XX(2)-JVS(100)*XX(24)-JVS(105)*XX(25)-JVS(111)*XX(26)-JVS(116)*XX(27))/(JVS(190))
  XX(49) = X(49)/JVS(193)
  XX(50) = X(50)/JVS(196)
  XX(51) = X(51)/JVS(200)
  XX(52) = X(52)/JVS(204)
  XX(53) = X(53)/JVS(208)
  XX(54) = X(54)/JVS(212)
  XX(55) = X(55)/JVS(216)
  XX(56) = X(56)/JVS(220)
  XX(57) = (X(57)-JVS(70)*XX(14)-JVS(73)*XX(15))/(JVS(229))
  XX(58) = (X(58)-JVS(82)*XX(18)-JVS(85)*XX(19))/(JVS(234))
  XX(59) = X(59)/JVS(238)
  XX(60) = X(60)/JVS(243)
  XX(61) = X(61)/JVS(249)
  XX(62) = X(62)/JVS(254)
  XX(63) = X(63)/JVS(264)
  XX(64) = X(64)/JVS(268)
  XX(65) = X(65)/JVS(272)
  XX(66) = (X(66)-JVS(117)*XX(27))/(JVS(279))
  XX(67) = (X(67)-JVS(88)*XX(20)-JVS(91)*XX(21))/(JVS(285))
  XX(68) = (X(68)-JVS(5)*XX(2))/(JVS(290))
  XX(69) = (X(69)-JVS(61)*XX(13)-JVS(134)*XX(32))/(JVS(293))
  XX(70) = (X(70)-JVS(6)*XX(2))/(JVS(297))
  XX(71) = (X(71)-JVS(7)*XX(2))/(JVS(302))
  XX(72) = (X(72)-JVS(48)*XX(6)-JVS(162)*XX(41)-JVS(167)*XX(42))/(JVS(315))
  XX(73) = (X(73)-JVS(62)*XX(13))/(JVS(320))
  XX(74) = X(74)/JVS(325)
  XX(75) = (X(75)-JVS(221)*XX(56))/(JVS(329))
  XX(76) = X(76)/JVS(333)
  XX(77) = (X(77)-JVS(8)*XX(2))/(JVS(338))
  XX(78) = X(78)/JVS(345)
  XX(79) = (X(79)-JVS(49)*XX(6)-JVS(163)*XX(41)-JVS(168)*XX(42))/(JVS(351))
  XX(80) = (X(80)-JVS(50)*XX(6)-JVS(147)*XX(37))/(JVS(355))
  XX(81) = X(81)/JVS(362)
  XX(82) = X(82)/JVS(370)
  XX(83) = X(83)/JVS(375)
  XX(84) = (X(84)-JVS(9)*XX(2))/(JVS(382))
  XX(85) = X(85)/JVS(389)
  XX(86) = (X(86)-JVS(255)*XX(62))/(JVS(395))
  XX(87) = X(87)/JVS(401)
  XX(88) = X(88)/JVS(406)
  XX(89) = (X(89)-JVS(256)*XX(62))/(JVS(419))
  XX(90) = (X(90)-JVS(257)*XX(62))/(JVS(425))
  XX(91) = (X(91)-JVS(10)*XX(2)-JVS(363)*XX(81))/(JVS(432))
  XX(92) = (X(92)-JVS(258)*XX(62))/(JVS(439))
  XX(93) = (X(93)-JVS(364)*XX(81))/(JVS(446))
  XX(94) = (X(94)-JVS(11)*XX(2)-JVS(36)*XX(4)-JVS(182)*XX(46)-JVS(239)*XX(59))/(JVS(452))
  XX(95) = (X(95)-JVS(259)*XX(62))/(JVS(458))
  XX(96) = X(96)/JVS(464)
  XX(97) = (X(97)-JVS(12)*XX(2)-JVS(139)*XX(34)-JVS(303)*XX(71))/(JVS(481))
  XX(98) = X(98)/JVS(488)
  XX(99) = (X(99)-JVS(260)*XX(62)-JVS(298)*XX(70))/(JVS(498))
  XX(100) = (X(100)-JVS(13)*XX(2)-JVS(164)*XX(41)-JVS(169)*XX(42)-JVS(304)*XX(71))/(JVS(504))
  XX(101) = (X(101)-JVS(261)*XX(62)-JVS(305)*XX(71))/(JVS(509))
  XX(102) = (X(102)-JVS(76)*XX(16)-JVS(79)*XX(17)-JVS(396)*XX(86)-JVS(499)*XX(99)-JVS(510)*XX(101))/(JVS(518))
  XX(103) = (X(103)-JVS(154)*XX(39)-JVS(420)*XX(89)-JVS(511)*XX(101))/(JVS(523))
  XX(104) = (X(104)-JVS(14)*XX(2))/(JVS(531))
  XX(105) = X(105)/JVS(566)
  XX(106) = (X(106)-JVS(56)*XX(10)-JVS(306)*XX(71))/(JVS(588))
  XX(107) = (X(107)-JVS(39)*XX(5)-JVS(390)*XX(85))/(JVS(597))
  XX(108) = (X(108)-JVS(15)*XX(2)-JVS(307)*XX(71)-JVS(334)*XX(76))/(JVS(610))
  XX(109) = X(109)/JVS(618)
  XX(110) = (X(110)-JVS(40)*XX(5)-JVS(391)*XX(85)-JVS(619)*XX(109))/(JVS(642))
  XX(111) = (X(111)-JVS(222)*XX(56)-JVS(567)*XX(105))/(JVS(659))
  XX(112) = (X(112)-JVS(158)*XX(40)-JVS(223)*XX(56)-JVS(568)*XX(105))/(JVS(675))
  XX(113) = (X(113)-JVS(482)*XX(97)-JVS(532)*XX(104))/(JVS(695))
  XX(114) = (X(114)-JVS(201)*XX(51)-JVS(407)*XX(88)-JVS(465)*XX(96)-JVS(533)*XX(104)-JVS(620)*XX(109)-JVS(676)*XX(112))&
              &/(JVS(706))
  XX(115) = (X(115)-JVS(32)*XX(3)-JVS(308)*XX(71)-JVS(371)*XX(82)-JVS(383)*XX(84)-JVS(589)*XX(106)-JVS(696)*XX(113))&
              &/(JVS(716))
  XX(116) = (X(116)-JVS(118)*XX(27))/(JVS(727))
  XX(117) = (X(117)-JVS(16)*XX(2)-JVS(376)*XX(83)-JVS(534)*XX(104)-JVS(728)*XX(116))/(JVS(742))
  XX(118) = (X(118)-JVS(33)*XX(3)-JVS(372)*XX(82)-JVS(590)*XX(106)-JVS(697)*XX(113)-JVS(717)*XX(115)-JVS(729)*XX(116))&
              &/(JVS(752))
  XX(119) = (X(119)-JVS(17)*XX(2)-JVS(106)*XX(25)-JVS(309)*XX(71)-JVS(621)*XX(109)-JVS(660)*XX(111))/(JVS(768))
  XX(120) = (X(120)-JVS(41)*XX(5)-JVS(63)*XX(13)-JVS(244)*XX(60)-JVS(453)*XX(94)-JVS(730)*XX(116))/(JVS(783))
  XX(121) = (X(121)-JVS(18)*XX(2)-JVS(466)*XX(96)-JVS(535)*XX(104)-JVS(569)*XX(105))/(JVS(792))
  XX(122) = (X(122)-JVS(326)*XX(74)-JVS(467)*XX(96)-JVS(536)*XX(104)-JVS(591)*XX(106)-JVS(622)*XX(109)-JVS(769)*XX(119))&
              &/(JVS(803))
  XX(123) = (X(123)-JVS(205)*XX(52)-JVS(408)*XX(88)-JVS(468)*XX(96)-JVS(489)*XX(98)-JVS(537)*XX(104)-JVS(623)*XX(109)&
              &-JVS(677)*XX(112))/(JVS(814))
  XX(124) = (X(124)-JVS(19)*XX(2)-JVS(148)*XX(37)-JVS(273)*XX(65)-JVS(384)*XX(84)-JVS(570)*XX(105)-JVS(611)*XX(108)&
              &-JVS(624)*XX(109)-JVS(661)*XX(111)-JVS(718)*XX(115)-JVS(731)*XX(116)-JVS(753)*XX(118)-JVS(770)*XX(119))&
              &/(JVS(823))
  XX(125) = (X(125)-JVS(119)*XX(27)-JVS(280)*XX(66)-JVS(409)*XX(88)-JVS(538)*XX(104)-JVS(625)*XX(109)-JVS(678)*XX(112))&
              &/(JVS(833))
  XX(126) = (X(126)-JVS(224)*XX(56)-JVS(330)*XX(75)-JVS(339)*XX(77)-JVS(346)*XX(78)-JVS(433)*XX(91)-JVS(469)*XX(96)&
              &-JVS(539)*XX(104)-JVS(571)*XX(105)-JVS(626)*XX(109)-JVS(662)*XX(111)-JVS(771)*XX(119))/(JVS(846))
  XX(127) = (X(127)-JVS(265)*XX(63)-JVS(410)*XX(88)-JVS(470)*XX(96)-JVS(540)*XX(104)-JVS(627)*XX(109)-JVS(679)*XX(112))&
              &/(JVS(856))
  XX(128) = (X(128)-JVS(20)*XX(2)-JVS(64)*XX(13)-JVS(377)*XX(83)-JVS(402)*XX(87)-JVS(793)*XX(121))/(JVS(869))
  XX(129) = (X(129)-JVS(269)*XX(64)-JVS(411)*XX(88)-JVS(471)*XX(96)-JVS(541)*XX(104)-JVS(628)*XX(109)-JVS(680)*XX(112)&
              &-JVS(732)*XX(116))/(JVS(881))
  XX(130) = (X(130)-JVS(281)*XX(66)-JVS(412)*XX(88)-JVS(472)*XX(96)-JVS(542)*XX(104)-JVS(629)*XX(109)-JVS(681)*XX(112)&
              &-JVS(834)*XX(125))/(JVS(891))
  XX(131) = (X(131)-JVS(217)*XX(55)-JVS(274)*XX(65)-JVS(413)*XX(88)-JVS(543)*XX(104)-JVS(630)*XX(109)-JVS(682)*XX(112))&
              &/(JVS(902))
  XX(132) = (X(132)-JVS(112)*XX(26)-JVS(225)*XX(56)-JVS(572)*XX(105))/(JVS(964))
  XX(133) = (X(133)-JVS(573)*XX(105)-JVS(598)*XX(107)-JVS(631)*XX(109)-JVS(643)*XX(110)-JVS(663)*XX(111)-JVS(733)&
              &*XX(116)-JVS(772)*XX(119)-JVS(784)*XX(120)-JVS(965)*XX(132))/(JVS(990))
  XX(134) = (X(134)-JVS(299)*XX(70)-JVS(473)*XX(96)-JVS(544)*XX(104)-JVS(698)*XX(113)-JVS(966)*XX(132))/(JVS(1001))
  XX(135) = (X(135)-JVS(574)*XX(105))/(JVS(1042))
  XX(136) = (X(136)-JVS(426)*XX(90)-JVS(440)*XX(92)-JVS(773)*XX(119)-JVS(847)*XX(126)-JVS(967)*XX(132)-JVS(1043)&
              &*XX(135))/(JVS(1067))
  XX(137) = (X(137)-JVS(21)*XX(2)-JVS(291)*XX(68)-JVS(294)*XX(69)-JVS(316)*XX(72)-JVS(321)*XX(73)-JVS(352)*XX(79)&
              &-JVS(356)*XX(80)-JVS(447)*XX(93)-JVS(474)*XX(96)-JVS(505)*XX(100)-JVS(545)*XX(104)-JVS(575)*XX(105)-JVS(592)&
              &*XX(106)-JVS(612)*XX(108)-JVS(632)*XX(109)-JVS(664)*XX(111)-JVS(699)*XX(113)-JVS(734)*XX(116)-JVS(754)&
              &*XX(118)-JVS(774)*XX(119)-JVS(824)*XX(124)-JVS(848)*XX(126)-JVS(968)*XX(132)-JVS(1044)*XX(135)-JVS(1068)&
              &*XX(136))/(JVS(1081))
  XX(138) = (X(138)-JVS(22)*XX(2)-JVS(120)*XX(27)-JVS(310)*XX(71)-JVS(546)*XX(104)-JVS(969)*XX(132)-JVS(1045)*XX(135))&
              &/(JVS(1117))
  XX(139) = (X(139)-JVS(183)*XX(46)-JVS(378)*XX(83)-JVS(441)*XX(92)-JVS(454)*XX(94)-JVS(512)*XX(101)-JVS(576)*XX(105)&
              &-JVS(743)*XX(117)-JVS(794)*XX(121)-JVS(870)*XX(128)-JVS(970)*XX(132)-JVS(1002)*XX(134)-JVS(1046)*XX(135)&
              &-JVS(1118)*XX(138))/(JVS(1140))
  XX(140) = (X(140)-JVS(392)*XX(85)-JVS(547)*XX(104)-JVS(633)*XX(109)-JVS(825)*XX(124)-JVS(971)*XX(132)-JVS(991)*XX(133)&
              &-JVS(1047)*XX(135)-JVS(1069)*XX(136)-JVS(1119)*XX(138)-JVS(1141)*XX(139))/(JVS(1156))
  XX(141) = (X(141)-JVS(365)*XX(81)-JVS(414)*XX(88)-JVS(475)*XX(96)-JVS(490)*XX(98)-JVS(548)*XX(104)-JVS(634)*XX(109)&
              &-JVS(683)*XX(112)-JVS(707)*XX(114)-JVS(815)*XX(123)-JVS(835)*XX(125)-JVS(903)*XX(131)-JVS(972)*XX(132)&
              &-JVS(1048)*XX(135)-JVS(1120)*XX(138))/(JVS(1172))
  XX(142) = (X(142)-JVS(577)*XX(105)-JVS(973)*XX(132))/(JVS(1198))
  XX(143) = (X(143)-JVS(415)*XX(88)-JVS(476)*XX(96)-JVS(549)*XX(104)-JVS(635)*XX(109)-JVS(684)*XX(112)-JVS(974)*XX(132)&
              &-JVS(1173)*XX(141)-JVS(1199)*XX(142))/(JVS(1221))
  XX(144) = (X(144)-JVS(459)*XX(95)-JVS(513)*XX(101)-JVS(524)*XX(103)-JVS(550)*XX(104)-JVS(804)*XX(122)-JVS(857)*XX(127)&
              &-JVS(882)*XX(129)-JVS(975)*XX(132)-JVS(1049)*XX(135)-JVS(1121)*XX(138)-JVS(1200)*XX(142))/(JVS(1238))
  XX(145) = (X(145)-JVS(23)*XX(2)-JVS(126)*XX(28)-JVS(155)*XX(39)-JVS(250)*XX(61)-JVS(275)*XX(65)-JVS(311)*XX(71)&
              &-JVS(340)*XX(77)-JVS(385)*XX(84)-JVS(397)*XX(86)-JVS(403)*XX(87)-JVS(421)*XX(89)-JVS(427)*XX(90)-JVS(434)&
              &*XX(91)-JVS(442)*XX(92)-JVS(460)*XX(95)-JVS(500)*XX(99)-JVS(506)*XX(100)-JVS(514)*XX(101)-JVS(519)*XX(102)&
              &-JVS(525)*XX(103)-JVS(551)*XX(104)-JVS(578)*XX(105)-JVS(593)*XX(106)-JVS(613)*XX(108)-JVS(636)*XX(109)&
              &-JVS(665)*XX(111)-JVS(700)*XX(113)-JVS(735)*XX(116)-JVS(755)*XX(118)-JVS(775)*XX(119)-JVS(805)*XX(122)&
              &-JVS(826)*XX(124)-JVS(858)*XX(127)-JVS(871)*XX(128)-JVS(883)*XX(129)-JVS(976)*XX(132)-JVS(992)*XX(133)&
              &-JVS(1003)*XX(134)-JVS(1050)*XX(135)-JVS(1070)*XX(136)-JVS(1082)*XX(137)-JVS(1122)*XX(138)-JVS(1142)*XX(139)&
              &-JVS(1157)*XX(140)-JVS(1174)*XX(141)-JVS(1201)*XX(142)-JVS(1222)*XX(143)-JVS(1239)*XX(144))/(JVS(1264))
  XX(146) = (X(146)-JVS(579)*XX(105)-JVS(904)*XX(131)-JVS(977)*XX(132)-JVS(1202)*XX(142))/(JVS(1310))
  XX(147) = (X(147)-JVS(24)*XX(2)-JVS(398)*XX(86)-JVS(422)*XX(89)-JVS(428)*XX(90)-JVS(443)*XX(92)-JVS(461)*XX(95)&
              &-JVS(501)*XX(99)-JVS(515)*XX(101)-JVS(552)*XX(104)-JVS(776)*XX(119)-JVS(978)*XX(132)-JVS(1004)*XX(134)&
              &-JVS(1051)*XX(135)-JVS(1123)*XX(138)-JVS(1143)*XX(139)-JVS(1203)*XX(142)-JVS(1240)*XX(144)-JVS(1265)*XX(145)&
              &-JVS(1311)*XX(146))/(JVS(1373))
  XX(148) = (X(148)-JVS(25)*XX(2)-JVS(37)*XX(4)-JVS(51)*XX(6)-JVS(57)*XX(10)-JVS(77)*XX(16)-JVS(95)*XX(22)-JVS(98)&
              &*XX(23)-JVS(101)*XX(24)-JVS(107)*XX(25)-JVS(113)*XX(26)-JVS(121)*XX(27)-JVS(128)*XX(29)-JVS(130)*XX(30)&
              &-JVS(132)*XX(31)-JVS(145)*XX(36)-JVS(149)*XX(37)-JVS(151)*XX(38)-JVS(156)*XX(39)-JVS(159)*XX(40)-JVS(165)&
              &*XX(41)-JVS(170)*XX(42)-JVS(172)*XX(43)-JVS(175)*XX(44)-JVS(178)*XX(45)-JVS(184)*XX(46)-JVS(191)*XX(48)&
              &-JVS(197)*XX(50)-JVS(202)*XX(51)-JVS(206)*XX(52)-JVS(209)*XX(53)-JVS(213)*XX(54)-JVS(218)*XX(55)-JVS(226)&
              &*XX(56)-JVS(230)*XX(57)-JVS(235)*XX(58)-JVS(240)*XX(59)-JVS(245)*XX(60)-JVS(262)*XX(62)-JVS(266)*XX(63)&
              &-JVS(270)*XX(64)-JVS(276)*XX(65)-JVS(282)*XX(66)-JVS(286)*XX(67)-JVS(292)*XX(68)-JVS(300)*XX(70)-JVS(312)&
              &*XX(71)-JVS(317)*XX(72)-JVS(322)*XX(73)-JVS(327)*XX(74)-JVS(331)*XX(75)-JVS(335)*XX(76)-JVS(341)*XX(77)&
              &-JVS(347)*XX(78)-JVS(353)*XX(79)-JVS(357)*XX(80)-JVS(366)*XX(81)-JVS(373)*XX(82)-JVS(379)*XX(83)-JVS(386)&
              &*XX(84)-JVS(393)*XX(85)-JVS(404)*XX(87)-JVS(416)*XX(88)-JVS(435)*XX(91)-JVS(455)*XX(94)-JVS(477)*XX(96)&
              &-JVS(483)*XX(97)-JVS(491)*XX(98)-JVS(507)*XX(100)-JVS(520)*XX(102)-JVS(526)*XX(103)-JVS(553)*XX(104)-JVS(580)&
              &*XX(105)-JVS(594)*XX(106)-JVS(599)*XX(107)-JVS(614)*XX(108)-JVS(637)*XX(109)-JVS(666)*XX(111)-JVS(685)&
              &*XX(112)-JVS(701)*XX(113)-JVS(708)*XX(114)-JVS(719)*XX(115)-JVS(736)*XX(116)-JVS(756)*XX(118)-JVS(777)&
              &*XX(119)-JVS(785)*XX(120)-JVS(795)*XX(121)-JVS(806)*XX(122)-JVS(816)*XX(123)-JVS(827)*XX(124)-JVS(836)&
              &*XX(125)-JVS(849)*XX(126)-JVS(859)*XX(127)-JVS(872)*XX(128)-JVS(884)*XX(129)-JVS(892)*XX(130)-JVS(905)&
              &*XX(131)-JVS(979)*XX(132)-JVS(993)*XX(133)-JVS(1005)*XX(134)-JVS(1052)*XX(135)-JVS(1071)*XX(136)-JVS(1083)&
              &*XX(137)-JVS(1124)*XX(138)-JVS(1144)*XX(139)-JVS(1158)*XX(140)-JVS(1175)*XX(141)-JVS(1204)*XX(142)-JVS(1223)&
              &*XX(143)-JVS(1241)*XX(144)-JVS(1266)*XX(145)-JVS(1312)*XX(146)-JVS(1374)*XX(147))/(JVS(1491))
  XX(149) = (X(149)-JVS(26)*XX(2)-JVS(34)*XX(3)-JVS(42)*XX(5)-JVS(74)*XX(15)-JVS(86)*XX(19)-JVS(92)*XX(21)-JVS(152)&
              &*XX(38)-JVS(231)*XX(57)-JVS(236)*XX(58)-JVS(251)*XX(61)-JVS(287)*XX(67)-JVS(295)*XX(69)-JVS(313)*XX(71)&
              &-JVS(323)*XX(73)-JVS(336)*XX(76)-JVS(342)*XX(77)-JVS(348)*XX(78)-JVS(367)*XX(81)-JVS(387)*XX(84)-JVS(399)&
              &*XX(86)-JVS(423)*XX(89)-JVS(429)*XX(90)-JVS(436)*XX(91)-JVS(444)*XX(92)-JVS(448)*XX(93)-JVS(462)*XX(95)&
              &-JVS(484)*XX(97)-JVS(492)*XX(98)-JVS(502)*XX(99)-JVS(508)*XX(100)-JVS(516)*XX(101)-JVS(554)*XX(104)-JVS(581)&
              &*XX(105)-JVS(595)*XX(106)-JVS(600)*XX(107)-JVS(615)*XX(108)-JVS(638)*XX(109)-JVS(644)*XX(110)-JVS(667)&
              &*XX(111)-JVS(686)*XX(112)-JVS(702)*XX(113)-JVS(709)*XX(114)-JVS(720)*XX(115)-JVS(737)*XX(116)-JVS(744)&
              &*XX(117)-JVS(757)*XX(118)-JVS(778)*XX(119)-JVS(786)*XX(120)-JVS(796)*XX(121)-JVS(807)*XX(122)-JVS(817)&
              &*XX(123)-JVS(828)*XX(124)-JVS(837)*XX(125)-JVS(850)*XX(126)-JVS(860)*XX(127)-JVS(873)*XX(128)-JVS(885)&
              &*XX(129)-JVS(893)*XX(130)-JVS(906)*XX(131)-JVS(980)*XX(132)-JVS(994)*XX(133)-JVS(1006)*XX(134)-JVS(1053)&
              &*XX(135)-JVS(1072)*XX(136)-JVS(1084)*XX(137)-JVS(1125)*XX(138)-JVS(1145)*XX(139)-JVS(1159)*XX(140)-JVS(1176)&
              &*XX(141)-JVS(1205)*XX(142)-JVS(1224)*XX(143)-JVS(1242)*XX(144)-JVS(1267)*XX(145)-JVS(1313)*XX(146)-JVS(1375)&
              &*XX(147)-JVS(1492)*XX(148))/(JVS(1554))
  XX(150) = (X(150)-JVS(582)*XX(105)-JVS(894)*XX(130)-JVS(907)*XX(131)-JVS(981)*XX(132)-JVS(1054)*XX(135)-JVS(1126)&
              &*XX(138)-JVS(1206)*XX(142)-JVS(1314)*XX(146)-JVS(1376)*XX(147)-JVS(1493)*XX(148)-JVS(1555)*XX(149))&
              &/(JVS(1588))
  XX(151) = (X(151)-JVS(27)*XX(2)-JVS(43)*XX(5)-JVS(65)*XX(13)-JVS(122)*XX(27)-JVS(188)*XX(47)-JVS(198)*XX(50)-JVS(227)&
              &*XX(56)-JVS(277)*XX(65)-JVS(417)*XX(88)-JVS(478)*XX(96)-JVS(493)*XX(98)-JVS(555)*XX(104)-JVS(601)*XX(107)&
              &-JVS(639)*XX(109)-JVS(645)*XX(110)-JVS(668)*XX(111)-JVS(687)*XX(112)-JVS(710)*XX(114)-JVS(738)*XX(116)&
              &-JVS(745)*XX(117)-JVS(779)*XX(119)-JVS(797)*XX(121)-JVS(808)*XX(122)-JVS(818)*XX(123)-JVS(829)*XX(124)&
              &-JVS(838)*XX(125)-JVS(851)*XX(126)-JVS(861)*XX(127)-JVS(874)*XX(128)-JVS(886)*XX(129)-JVS(895)*XX(130)&
              &-JVS(908)*XX(131)-JVS(982)*XX(132)-JVS(995)*XX(133)-JVS(1007)*XX(134)-JVS(1055)*XX(135)-JVS(1073)*XX(136)&
              &-JVS(1085)*XX(137)-JVS(1127)*XX(138)-JVS(1146)*XX(139)-JVS(1160)*XX(140)-JVS(1177)*XX(141)-JVS(1207)*XX(142)&
              &-JVS(1225)*XX(143)-JVS(1243)*XX(144)-JVS(1268)*XX(145)-JVS(1315)*XX(146)-JVS(1377)*XX(147)-JVS(1494)*XX(148)&
              &-JVS(1556)*XX(149)-JVS(1589)*XX(150))/(JVS(1645))
  XX(152) = (X(152)-JVS(66)*XX(13)-JVS(142)*XX(35)-JVS(246)*XX(60)-JVS(688)*XX(112)-JVS(909)*XX(131)-JVS(983)*XX(132)&
              &-JVS(1208)*XX(142)-JVS(1269)*XX(145)-JVS(1316)*XX(146)-JVS(1378)*XX(147)-JVS(1495)*XX(148)-JVS(1557)*XX(149)&
              &-JVS(1590)*XX(150)-JVS(1646)*XX(151))/(JVS(1666))
  XX(153) = (X(153)-JVS(44)*XX(5)-JVS(136)*XX(33)-JVS(140)*XX(34)-JVS(143)*XX(35)-JVS(185)*XX(46)-JVS(189)*XX(47)&
              &-JVS(194)*XX(49)-JVS(210)*XX(53)-JVS(241)*XX(59)-JVS(252)*XX(61)-JVS(400)*XX(86)-JVS(405)*XX(87)-JVS(424)&
              &*XX(89)-JVS(430)*XX(90)-JVS(445)*XX(92)-JVS(456)*XX(94)-JVS(463)*XX(95)-JVS(485)*XX(97)-JVS(503)*XX(99)&
              &-JVS(517)*XX(101)-JVS(556)*XX(104)-JVS(583)*XX(105)-JVS(689)*XX(112)-JVS(780)*XX(119)-JVS(787)*XX(120)&
              &-JVS(875)*XX(128)-JVS(984)*XX(132)-JVS(1008)*XX(134)-JVS(1056)*XX(135)-JVS(1128)*XX(138)-JVS(1147)*XX(139)&
              &-JVS(1209)*XX(142)-JVS(1244)*XX(144)-JVS(1270)*XX(145)-JVS(1317)*XX(146)-JVS(1379)*XX(147)-JVS(1496)*XX(148)&
              &-JVS(1558)*XX(149)-JVS(1591)*XX(150)-JVS(1647)*XX(151)-JVS(1667)*XX(152))/(JVS(1754))
  XX(154) = (X(154)-JVS(28)*XX(2)-JVS(45)*XX(5)-JVS(80)*XX(17)-JVS(137)*XX(33)-JVS(160)*XX(40)-JVS(173)*XX(43)-JVS(176)&
              &*XX(44)-JVS(186)*XX(46)-JVS(192)*XX(48)-JVS(253)*XX(61)-JVS(288)*XX(67)-JVS(368)*XX(81)-JVS(380)*XX(83)&
              &-JVS(457)*XX(94)-JVS(521)*XX(102)-JVS(527)*XX(103)-JVS(557)*XX(104)-JVS(584)*XX(105)-JVS(646)*XX(110)&
              &-JVS(669)*XX(111)-JVS(690)*XX(112)-JVS(739)*XX(116)-JVS(746)*XX(117)-JVS(788)*XX(120)-JVS(798)*XX(121)&
              &-JVS(809)*XX(122)-JVS(862)*XX(127)-JVS(876)*XX(128)-JVS(887)*XX(129)-JVS(896)*XX(130)-JVS(910)*XX(131)&
              &-JVS(985)*XX(132)-JVS(996)*XX(133)-JVS(1009)*XX(134)-JVS(1057)*XX(135)-JVS(1074)*XX(136)-JVS(1086)*XX(137)&
              &-JVS(1129)*XX(138)-JVS(1148)*XX(139)-JVS(1161)*XX(140)-JVS(1178)*XX(141)-JVS(1210)*XX(142)-JVS(1226)*XX(143)&
              &-JVS(1245)*XX(144)-JVS(1271)*XX(145)-JVS(1318)*XX(146)-JVS(1380)*XX(147)-JVS(1497)*XX(148)-JVS(1559)*XX(149)&
              &-JVS(1592)*XX(150)-JVS(1648)*XX(151)-JVS(1668)*XX(152)-JVS(1755)*XX(153))/(JVS(1825))
  XX(155) = (X(155)-JVS(29)*XX(2)-JVS(123)*XX(27)-JVS(179)*XX(45)-JVS(242)*XX(59)-JVS(343)*XX(77)-JVS(349)*XX(78)&
              &-JVS(437)*XX(91)-JVS(449)*XX(93)-JVS(494)*XX(98)-JVS(558)*XX(104)-JVS(585)*XX(105)-JVS(670)*XX(111)-JVS(691)&
              &*XX(112)-JVS(711)*XX(114)-JVS(740)*XX(116)-JVS(747)*XX(117)-JVS(781)*XX(119)-JVS(799)*XX(121)-JVS(810)&
              &*XX(122)-JVS(819)*XX(123)-JVS(839)*XX(125)-JVS(852)*XX(126)-JVS(863)*XX(127)-JVS(877)*XX(128)-JVS(888)&
              &*XX(129)-JVS(897)*XX(130)-JVS(911)*XX(131)-JVS(986)*XX(132)-JVS(997)*XX(133)-JVS(1010)*XX(134)-JVS(1058)&
              &*XX(135)-JVS(1075)*XX(136)-JVS(1087)*XX(137)-JVS(1130)*XX(138)-JVS(1149)*XX(139)-JVS(1162)*XX(140)-JVS(1179)&
              &*XX(141)-JVS(1211)*XX(142)-JVS(1227)*XX(143)-JVS(1246)*XX(144)-JVS(1272)*XX(145)-JVS(1319)*XX(146)-JVS(1381)&
              &*XX(147)-JVS(1498)*XX(148)-JVS(1560)*XX(149)-JVS(1593)*XX(150)-JVS(1649)*XX(151)-JVS(1669)*XX(152)-JVS(1756)&
              &*XX(153)-JVS(1826)*XX(154))/(JVS(1882))
  XX(156) = (X(156)-JVS(495)*XX(98)-JVS(712)*XX(114)-JVS(820)*XX(123)-JVS(840)*XX(125)-JVS(912)*XX(131)-JVS(987)*XX(132)&
              &-JVS(1059)*XX(135)-JVS(1131)*XX(138)-JVS(1212)*XX(142)-JVS(1228)*XX(143)-JVS(1320)*XX(146)-JVS(1382)*XX(147)&
              &-JVS(1499)*XX(148)-JVS(1561)*XX(149)-JVS(1594)*XX(150)-JVS(1650)*XX(151)-JVS(1670)*XX(152)-JVS(1757)*XX(153)&
              &-JVS(1827)*XX(154)-JVS(1883)*XX(155))/(JVS(1906))
  XX(157) = (X(157)-JVS(67)*XX(13)-JVS(124)*XX(27)-JVS(195)*XX(49)-JVS(214)*XX(54)-JVS(278)*XX(65)-JVS(418)*XX(88)&
              &-JVS(479)*XX(96)-JVS(496)*XX(98)-JVS(559)*XX(104)-JVS(640)*XX(109)-JVS(692)*XX(112)-JVS(713)*XX(114)-JVS(821)&
              &*XX(123)-JVS(841)*XX(125)-JVS(864)*XX(127)-JVS(889)*XX(129)-JVS(898)*XX(130)-JVS(913)*XX(131)-JVS(988)&
              &*XX(132)-JVS(1060)*XX(135)-JVS(1132)*XX(138)-JVS(1180)*XX(141)-JVS(1213)*XX(142)-JVS(1229)*XX(143)-JVS(1321)&
              &*XX(146)-JVS(1383)*XX(147)-JVS(1500)*XX(148)-JVS(1562)*XX(149)-JVS(1595)*XX(150)-JVS(1651)*XX(151)-JVS(1671)&
              &*XX(152)-JVS(1758)*XX(153)-JVS(1828)*XX(154)-JVS(1884)*XX(155)-JVS(1907)*XX(156))/(JVS(1934))
  XX(158) = (X(158)-JVS(30)*XX(2)-JVS(46)*XX(5)-JVS(68)*XX(13)-JVS(71)*XX(14)-JVS(83)*XX(18)-JVS(89)*XX(20)-JVS(180)&
              &*XX(45)-JVS(199)*XX(50)-JVS(203)*XX(51)-JVS(207)*XX(52)-JVS(211)*XX(53)-JVS(215)*XX(54)-JVS(219)*XX(55)&
              &-JVS(232)*XX(57)-JVS(237)*XX(58)-JVS(247)*XX(60)-JVS(263)*XX(62)-JVS(267)*XX(63)-JVS(271)*XX(64)-JVS(283)&
              &*XX(66)-JVS(289)*XX(67)-JVS(296)*XX(69)-JVS(301)*XX(70)-JVS(314)*XX(71)-JVS(318)*XX(72)-JVS(324)*XX(73)&
              &-JVS(328)*XX(74)-JVS(332)*XX(75)-JVS(337)*XX(76)-JVS(350)*XX(78)-JVS(354)*XX(79)-JVS(358)*XX(80)-JVS(369)&
              &*XX(81)-JVS(374)*XX(82)-JVS(381)*XX(83)-JVS(388)*XX(84)-JVS(394)*XX(85)-JVS(438)*XX(91)-JVS(450)*XX(93)&
              &-JVS(486)*XX(97)-JVS(497)*XX(98)-JVS(560)*XX(104)-JVS(586)*XX(105)-JVS(596)*XX(106)-JVS(602)*XX(107)-JVS(616)&
              &*XX(108)-JVS(641)*XX(109)-JVS(647)*XX(110)-JVS(671)*XX(111)-JVS(693)*XX(112)-JVS(703)*XX(113)-JVS(714)&
              &*XX(114)-JVS(721)*XX(115)-JVS(741)*XX(116)-JVS(748)*XX(117)-JVS(758)*XX(118)-JVS(782)*XX(119)-JVS(789)&
              &*XX(120)-JVS(800)*XX(121)-JVS(811)*XX(122)-JVS(822)*XX(123)-JVS(842)*XX(125)-JVS(853)*XX(126)-JVS(865)&
              &*XX(127)-JVS(878)*XX(128)-JVS(890)*XX(129)-JVS(899)*XX(130)-JVS(914)*XX(131)-JVS(989)*XX(132)-JVS(1011)&
              &*XX(134)-JVS(1061)*XX(135)-JVS(1076)*XX(136)-JVS(1088)*XX(137)-JVS(1133)*XX(138)-JVS(1150)*XX(139)-JVS(1163)&
              &*XX(140)-JVS(1181)*XX(141)-JVS(1214)*XX(142)-JVS(1230)*XX(143)-JVS(1247)*XX(144)-JVS(1273)*XX(145)-JVS(1322)&
              &*XX(146)-JVS(1384)*XX(147)-JVS(1501)*XX(148)-JVS(1563)*XX(149)-JVS(1596)*XX(150)-JVS(1652)*XX(151)-JVS(1672)&
              &*XX(152)-JVS(1759)*XX(153)-JVS(1829)*XX(154)-JVS(1885)*XX(155)-JVS(1908)*XX(156)-JVS(1935)*XX(157))&
              &/(JVS(2038))
  XX(158) = XX(158)
  XX(157) = XX(157)-JVS(2037)*XX(158)
  XX(156) = XX(156)-JVS(1933)*XX(157)-JVS(2036)*XX(158)
  XX(155) = XX(155)-JVS(1905)*XX(156)-JVS(1932)*XX(157)-JVS(2035)*XX(158)
  XX(154) = XX(154)-JVS(1881)*XX(155)-JVS(1904)*XX(156)-JVS(1931)*XX(157)-JVS(2034)*XX(158)
  XX(153) = XX(153)-JVS(1824)*XX(154)-JVS(1880)*XX(155)-JVS(1903)*XX(156)-JVS(1930)*XX(157)-JVS(2033)*XX(158)
  XX(152) = XX(152)-JVS(1753)*XX(153)-JVS(1823)*XX(154)-JVS(1879)*XX(155)-JVS(1902)*XX(156)-JVS(1929)*XX(157)-JVS(2032)&
              &*XX(158)
  XX(151) = XX(151)-JVS(1665)*XX(152)-JVS(1752)*XX(153)-JVS(1822)*XX(154)-JVS(1878)*XX(155)-JVS(1901)*XX(156)-JVS(1928)&
              &*XX(157)-JVS(2031)*XX(158)
  XX(150) = XX(150)-JVS(1644)*XX(151)-JVS(1664)*XX(152)-JVS(1751)*XX(153)-JVS(1821)*XX(154)-JVS(1877)*XX(155)-JVS(1900)&
              &*XX(156)-JVS(1927)*XX(157)-JVS(2030)*XX(158)
  XX(149) = XX(149)-JVS(1587)*XX(150)-JVS(1643)*XX(151)-JVS(1663)*XX(152)-JVS(1750)*XX(153)-JVS(1820)*XX(154)-JVS(1876)&
              &*XX(155)-JVS(1899)*XX(156)-JVS(1926)*XX(157)-JVS(2029)*XX(158)
  XX(148) = XX(148)-JVS(1553)*XX(149)-JVS(1586)*XX(150)-JVS(1642)*XX(151)-JVS(1662)*XX(152)-JVS(1749)*XX(153)-JVS(1819)&
              &*XX(154)-JVS(1875)*XX(155)-JVS(1898)*XX(156)-JVS(1925)*XX(157)-JVS(2028)*XX(158)
  XX(147) = XX(147)-JVS(1490)*XX(148)-JVS(1552)*XX(149)-JVS(1585)*XX(150)-JVS(1641)*XX(151)-JVS(1661)*XX(152)-JVS(1748)&
              &*XX(153)-JVS(1818)*XX(154)-JVS(1874)*XX(155)-JVS(1897)*XX(156)-JVS(1924)*XX(157)-JVS(2027)*XX(158)
  XX(146) = XX(146)-JVS(1372)*XX(147)-JVS(1489)*XX(148)-JVS(1551)*XX(149)-JVS(1640)*XX(151)-JVS(1660)*XX(152)-JVS(1747)&
              &*XX(153)-JVS(1817)*XX(154)-JVS(1873)*XX(155)-JVS(1923)*XX(157)-JVS(2026)*XX(158)
  XX(145) = XX(145)-JVS(1309)*XX(146)-JVS(1371)*XX(147)-JVS(1488)*XX(148)-JVS(1550)*XX(149)-JVS(1584)*XX(150)-JVS(1639)&
              &*XX(151)-JVS(1659)*XX(152)-JVS(1746)*XX(153)-JVS(1816)*XX(154)-JVS(1872)*XX(155)-JVS(1896)*XX(156)-JVS(1922)&
              &*XX(157)-JVS(2025)*XX(158)
  XX(144) = XX(144)-JVS(1263)*XX(145)-JVS(1308)*XX(146)-JVS(1370)*XX(147)-JVS(1487)*XX(148)-JVS(1549)*XX(149)-JVS(1583)&
              &*XX(150)-JVS(1638)*XX(151)-JVS(1658)*XX(152)-JVS(1745)*XX(153)-JVS(1815)*XX(154)-JVS(1871)*XX(155)-JVS(1921)&
              &*XX(157)-JVS(2024)*XX(158)
  XX(143) = XX(143)-JVS(1307)*XX(146)-JVS(1369)*XX(147)-JVS(1486)*XX(148)-JVS(1548)*XX(149)-JVS(1582)*XX(150)-JVS(1637)&
              &*XX(151)-JVS(1744)*XX(153)-JVS(1814)*XX(154)-JVS(1870)*XX(155)-JVS(1895)*XX(156)-JVS(1920)*XX(157)-JVS(2023)&
              &*XX(158)
  XX(142) = XX(142)-JVS(1368)*XX(147)-JVS(1485)*XX(148)-JVS(1636)*XX(151)-JVS(1743)*XX(153)-JVS(1813)*XX(154)-JVS(1869)&
              &*XX(155)-JVS(2022)*XX(158)
  XX(141) = XX(141)-JVS(1197)*XX(142)-JVS(1306)*XX(146)-JVS(1367)*XX(147)-JVS(1484)*XX(148)-JVS(1547)*XX(149)-JVS(1581)&
              &*XX(150)-JVS(1635)*XX(151)-JVS(1742)*XX(153)-JVS(1812)*XX(154)-JVS(1868)*XX(155)-JVS(1894)*XX(156)-JVS(1919)&
              &*XX(157)-JVS(2021)*XX(158)
  XX(140) = XX(140)-JVS(1171)*XX(141)-JVS(1196)*XX(142)-JVS(1220)*XX(143)-JVS(1237)*XX(144)-JVS(1262)*XX(145)-JVS(1305)&
              &*XX(146)-JVS(1366)*XX(147)-JVS(1483)*XX(148)-JVS(1546)*XX(149)-JVS(1580)*XX(150)-JVS(1634)*XX(151)-JVS(1657)&
              &*XX(152)-JVS(1741)*XX(153)-JVS(1811)*XX(154)-JVS(1867)*XX(155)-JVS(1893)*XX(156)-JVS(2020)*XX(158)
  XX(139) = XX(139)-JVS(1261)*XX(145)-JVS(1304)*XX(146)-JVS(1365)*XX(147)-JVS(1482)*XX(148)-JVS(1545)*XX(149)-JVS(1579)&
              &*XX(150)-JVS(1633)*XX(151)-JVS(1740)*XX(153)-JVS(1810)*XX(154)-JVS(1866)*XX(155)-JVS(1892)*XX(156)-JVS(2019)&
              &*XX(158)
  XX(138) = XX(138)-JVS(1364)*XX(147)-JVS(1481)*XX(148)-JVS(1632)*XX(151)-JVS(1739)*XX(153)-JVS(1809)*XX(154)-JVS(1865)&
              &*XX(155)-JVS(2018)*XX(158)
  XX(137) = XX(137)-JVS(1116)*XX(138)-JVS(1139)*XX(139)-JVS(1170)*XX(141)-JVS(1195)*XX(142)-JVS(1219)*XX(143)-JVS(1236)&
              &*XX(144)-JVS(1260)*XX(145)-JVS(1303)*XX(146)-JVS(1363)*XX(147)-JVS(1480)*XX(148)-JVS(1544)*XX(149)-JVS(1578)&
              &*XX(150)-JVS(1631)*XX(151)-JVS(1738)*XX(153)-JVS(1808)*XX(154)-JVS(1864)*XX(155)-JVS(2017)*XX(158)
  XX(136) = XX(136)-JVS(1115)*XX(138)-JVS(1169)*XX(141)-JVS(1259)*XX(145)-JVS(1302)*XX(146)-JVS(1362)*XX(147)-JVS(1479)&
              &*XX(148)-JVS(1543)*XX(149)-JVS(1577)*XX(150)-JVS(1630)*XX(151)-JVS(1737)*XX(153)-JVS(1807)*XX(154)-JVS(1863)&
              &*XX(155)-JVS(2016)*XX(158)
  XX(135) = XX(135)-JVS(1361)*XX(147)-JVS(1478)*XX(148)-JVS(1736)*XX(153)-JVS(1806)*XX(154)-JVS(1862)*XX(155)-JVS(2015)&
              &*XX(158)
  XX(134) = XX(134)-JVS(1041)*XX(135)-JVS(1114)*XX(138)-JVS(1301)*XX(146)-JVS(1360)*XX(147)-JVS(1477)*XX(148)-JVS(1542)&
              &*XX(149)-JVS(1576)*XX(150)-JVS(1629)*XX(151)-JVS(1735)*XX(153)-JVS(1805)*XX(154)-JVS(1861)*XX(155)-JVS(2014)&
              &*XX(158)
  XX(133) = XX(133)-JVS(1040)*XX(135)-JVS(1113)*XX(138)-JVS(1155)*XX(140)-JVS(1194)*XX(142)-JVS(1258)*XX(145)-JVS(1300)&
              &*XX(146)-JVS(1359)*XX(147)-JVS(1476)*XX(148)-JVS(1541)*XX(149)-JVS(1575)*XX(150)-JVS(1628)*XX(151)-JVS(1656)&
              &*XX(152)-JVS(1734)*XX(153)-JVS(1804)*XX(154)-JVS(1860)*XX(155)-JVS(1891)*XX(156)-JVS(2013)*XX(158)
  XX(132) = XX(132)-JVS(1358)*XX(147)-JVS(1475)*XX(148)-JVS(1733)*XX(153)-JVS(1803)*XX(154)-JVS(2012)*XX(158)
  XX(131) = XX(131)-JVS(963)*XX(132)-JVS(1193)*XX(142)-JVS(1474)*XX(148)-JVS(1540)*XX(149)-JVS(1627)*XX(151)-JVS(1732)&
              &*XX(153)-JVS(1802)*XX(154)-JVS(1859)*XX(155)-JVS(1918)*XX(157)-JVS(2011)*XX(158)
  XX(130) = XX(130)-JVS(962)*XX(132)-JVS(1039)*XX(135)-JVS(1112)*XX(138)-JVS(1192)*XX(142)-JVS(1299)*XX(146)-JVS(1473)&
              &*XX(148)-JVS(1539)*XX(149)-JVS(1574)*XX(150)-JVS(1626)*XX(151)-JVS(1731)*XX(153)-JVS(1801)*XX(154)-JVS(1858)&
              &*XX(155)-JVS(1890)*XX(156)-JVS(1917)*XX(157)-JVS(2010)*XX(158)
  XX(129) = XX(129)-JVS(961)*XX(132)-JVS(1038)*XX(135)-JVS(1191)*XX(142)-JVS(1298)*XX(146)-JVS(1357)*XX(147)-JVS(1472)&
              &*XX(148)-JVS(1538)*XX(149)-JVS(1625)*XX(151)-JVS(1730)*XX(153)-JVS(1800)*XX(154)-JVS(1857)*XX(155)-JVS(1916)&
              &*XX(157)-JVS(2009)*XX(158)
  XX(128) = XX(128)-JVS(960)*XX(132)-JVS(1111)*XX(138)-JVS(1257)*XX(145)-JVS(1297)*XX(146)-JVS(1356)*XX(147)-JVS(1471)&
              &*XX(148)-JVS(1537)*XX(149)-JVS(1573)*XX(150)-JVS(1624)*XX(151)-JVS(1729)*XX(153)-JVS(1799)*XX(154)-JVS(1856)&
              &*XX(155)-JVS(2008)*XX(158)
  XX(127) = XX(127)-JVS(959)*XX(132)-JVS(1110)*XX(138)-JVS(1190)*XX(142)-JVS(1296)*XX(146)-JVS(1470)*XX(148)-JVS(1536)&
              &*XX(149)-JVS(1623)*XX(151)-JVS(1728)*XX(153)-JVS(1798)*XX(154)-JVS(1855)*XX(155)-JVS(1915)*XX(157)-JVS(2007)&
              &*XX(158)
  XX(126) = XX(126)-JVS(958)*XX(132)-JVS(1037)*XX(135)-JVS(1109)*XX(138)-JVS(1168)*XX(141)-JVS(1256)*XX(145)-JVS(1295)&
              &*XX(146)-JVS(1355)*XX(147)-JVS(1469)*XX(148)-JVS(1535)*XX(149)-JVS(1572)*XX(150)-JVS(1622)*XX(151)-JVS(1727)&
              &*XX(153)-JVS(1797)*XX(154)-JVS(1854)*XX(155)-JVS(2006)*XX(158)
  XX(125) = XX(125)-JVS(957)*XX(132)-JVS(1036)*XX(135)-JVS(1108)*XX(138)-JVS(1468)*XX(148)-JVS(1534)*XX(149)-JVS(1621)&
              &*XX(151)-JVS(1726)*XX(153)-JVS(1796)*XX(154)-JVS(1853)*XX(155)-JVS(1914)*XX(157)-JVS(2005)*XX(158)
  XX(124) = XX(124)-JVS(956)*XX(132)-JVS(1035)*XX(135)-JVS(1066)*XX(136)-JVS(1107)*XX(138)-JVS(1189)*XX(142)-JVS(1218)&
              &*XX(143)-JVS(1255)*XX(145)-JVS(1294)*XX(146)-JVS(1354)*XX(147)-JVS(1467)*XX(148)-JVS(1533)*XX(149)-JVS(1620)&
              &*XX(151)-JVS(1725)*XX(153)-JVS(1795)*XX(154)-JVS(1852)*XX(155)-JVS(2004)*XX(158)
  XX(123) = XX(123)-JVS(832)*XX(125)-JVS(955)*XX(132)-JVS(1293)*XX(146)-JVS(1353)*XX(147)-JVS(1466)*XX(148)-JVS(1532)&
              &*XX(149)-JVS(1619)*XX(151)-JVS(1724)*XX(153)-JVS(1794)*XX(154)-JVS(1851)*XX(155)-JVS(1913)*XX(157)-JVS(2003)&
              &*XX(158)
  XX(122) = XX(122)-JVS(954)*XX(132)-JVS(1034)*XX(135)-JVS(1292)*XX(146)-JVS(1352)*XX(147)-JVS(1465)*XX(148)-JVS(1531)&
              &*XX(149)-JVS(1571)*XX(150)-JVS(1618)*XX(151)-JVS(1723)*XX(153)-JVS(1793)*XX(154)-JVS(1850)*XX(155)-JVS(2002)&
              &*XX(158)
  XX(121) = XX(121)-JVS(953)*XX(132)-JVS(1106)*XX(138)-JVS(1291)*XX(146)-JVS(1464)*XX(148)-JVS(1530)*XX(149)-JVS(1570)&
              &*XX(150)-JVS(1617)*XX(151)-JVS(1722)*XX(153)-JVS(1792)*XX(154)-JVS(1849)*XX(155)-JVS(2001)*XX(158)
  XX(120) = XX(120)-JVS(952)*XX(132)-JVS(1033)*XX(135)-JVS(1105)*XX(138)-JVS(1188)*XX(142)-JVS(1254)*XX(145)-JVS(1351)&
              &*XX(147)-JVS(1463)*XX(148)-JVS(1529)*XX(149)-JVS(1616)*XX(151)-JVS(1655)*XX(152)-JVS(1721)*XX(153)-JVS(1791)&
              &*XX(154)-JVS(1848)*XX(155)-JVS(2000)*XX(158)
  XX(119) = XX(119)-JVS(951)*XX(132)-JVS(1350)*XX(147)-JVS(1462)*XX(148)-JVS(1720)*XX(153)-JVS(1790)*XX(154)-JVS(1999)&
              &*XX(158)
  XX(118) = XX(118)-JVS(767)*XX(119)-JVS(950)*XX(132)-JVS(1032)*XX(135)-JVS(1104)*XX(138)-JVS(1217)*XX(143)-JVS(1290)&
              &*XX(146)-JVS(1349)*XX(147)-JVS(1461)*XX(148)-JVS(1528)*XX(149)-JVS(1615)*XX(151)-JVS(1719)*XX(153)-JVS(1789)&
              &*XX(154)-JVS(1847)*XX(155)-JVS(1998)*XX(158)
  XX(117) = XX(117)-JVS(791)*XX(121)-JVS(868)*XX(128)-JVS(949)*XX(132)-JVS(1031)*XX(135)-JVS(1289)*XX(146)-JVS(1348)&
              &*XX(147)-JVS(1460)*XX(148)-JVS(1527)*XX(149)-JVS(1614)*XX(151)-JVS(1718)*XX(153)-JVS(1846)*XX(155)-JVS(1889)&
              &*XX(156)-JVS(1997)*XX(158)
  XX(116) = XX(116)-JVS(948)*XX(132)-JVS(1030)*XX(135)-JVS(1347)*XX(147)-JVS(1459)*XX(148)-JVS(1613)*XX(151)-JVS(1717)&
              &*XX(153)
  XX(115) = XX(115)-JVS(726)*XX(116)-JVS(751)*XX(118)-JVS(766)*XX(119)-JVS(947)*XX(132)-JVS(1029)*XX(135)-JVS(1103)&
              &*XX(138)-JVS(1216)*XX(143)-JVS(1288)*XX(146)-JVS(1346)*XX(147)-JVS(1458)*XX(148)-JVS(1526)*XX(149)-JVS(1612)&
              &*XX(151)-JVS(1716)*XX(153)-JVS(1788)*XX(154)-JVS(1845)*XX(155)-JVS(1996)*XX(158)
  XX(114) = XX(114)-JVS(946)*XX(132)-JVS(1287)*XX(146)-JVS(1457)*XX(148)-JVS(1525)*XX(149)-JVS(1611)*XX(151)-JVS(1715)&
              &*XX(153)-JVS(1787)*XX(154)-JVS(1844)*XX(155)-JVS(1912)*XX(157)-JVS(1995)*XX(158)
  XX(113) = XX(113)-JVS(945)*XX(132)-JVS(1028)*XX(135)-JVS(1102)*XX(138)-JVS(1345)*XX(147)-JVS(1456)*XX(148)-JVS(1524)&
              &*XX(149)-JVS(1610)*XX(151)-JVS(1714)*XX(153)-JVS(1786)*XX(154)-JVS(1994)*XX(158)
  XX(112) = XX(112)-JVS(1455)*XX(148)-JVS(1713)*XX(153)-JVS(1785)*XX(154)-JVS(1993)*XX(158)
  XX(111) = XX(111)-JVS(944)*XX(132)-JVS(1344)*XX(147)-JVS(1454)*XX(148)-JVS(1712)*XX(153)-JVS(1784)*XX(154)-JVS(1992)&
              &*XX(158)
  XX(110) = XX(110)-JVS(658)*XX(111)-JVS(725)*XX(116)-JVS(943)*XX(132)-JVS(1154)*XX(140)-JVS(1286)*XX(146)-JVS(1453)&
              &*XX(148)-JVS(1523)*XX(149)-JVS(1569)*XX(150)-JVS(1609)*XX(151)-JVS(1711)*XX(153)-JVS(1783)*XX(154)-JVS(1888)&
              &*XX(156)-JVS(1991)*XX(158)
  XX(109) = XX(109)-JVS(942)*XX(132)-JVS(1452)*XX(148)-JVS(1990)*XX(158)
  XX(108) = XX(108)-JVS(657)*XX(111)-JVS(765)*XX(119)-JVS(941)*XX(132)-JVS(1027)*XX(135)-JVS(1101)*XX(138)-JVS(1343)&
              &*XX(147)-JVS(1451)*XX(148)-JVS(1522)*XX(149)-JVS(1710)*XX(153)-JVS(1843)*XX(155)-JVS(1989)*XX(158)
  XX(107) = XX(107)-JVS(617)*XX(109)-JVS(656)*XX(111)-JVS(724)*XX(116)-JVS(940)*XX(132)-JVS(1153)*XX(140)-JVS(1285)&
              &*XX(146)-JVS(1450)*XX(148)-JVS(1521)*XX(149)-JVS(1568)*XX(150)-JVS(1608)*XX(151)-JVS(1709)*XX(153)-JVS(1887)&
              &*XX(156)-JVS(1988)*XX(158)
  XX(106) = XX(106)-JVS(764)*XX(119)-JVS(939)*XX(132)-JVS(1026)*XX(135)-JVS(1449)*XX(148)-JVS(1708)*XX(153)-JVS(1782)&
              &*XX(154)-JVS(1842)*XX(155)-JVS(1987)*XX(158)
  XX(105) = XX(105)-JVS(1448)*XX(148)-JVS(1707)*XX(153)-JVS(1781)*XX(154)
  XX(104) = XX(104)-JVS(1447)*XX(148)-JVS(1607)*XX(151)
  XX(103) = XX(103)-JVS(530)*XX(104)-JVS(855)*XX(127)-JVS(880)*XX(129)-JVS(938)*XX(132)-JVS(1187)*XX(142)-JVS(1253)&
              &*XX(145)-JVS(1342)*XX(147)-JVS(1446)*XX(148)-JVS(1520)*XX(149)-JVS(1606)*XX(151)-JVS(1706)*XX(153)-JVS(1780)&
              &*XX(154)-JVS(1986)*XX(158)
  XX(102) = XX(102)-JVS(522)*XX(103)-JVS(802)*XX(122)-JVS(937)*XX(132)-JVS(1000)*XX(134)-JVS(1080)*XX(137)-JVS(1100)&
              &*XX(138)-JVS(1138)*XX(139)-JVS(1152)*XX(140)-JVS(1235)*XX(144)-JVS(1252)*XX(145)-JVS(1341)*XX(147)-JVS(1445)&
              &*XX(148)-JVS(1519)*XX(149)-JVS(1605)*XX(151)-JVS(1705)*XX(153)-JVS(1779)*XX(154)-JVS(1841)*XX(155)-JVS(1985)&
              &*XX(158)
  XX(101) = XX(101)-JVS(936)*XX(132)-JVS(1340)*XX(147)-JVS(1444)*XX(148)-JVS(1518)*XX(149)-JVS(1704)*XX(153)-JVS(1778)&
              &*XX(154)-JVS(1984)*XX(158)
  XX(100) = XX(100)-JVS(565)*XX(105)-JVS(587)*XX(106)-JVS(609)*XX(108)-JVS(694)*XX(113)-JVS(723)*XX(116)-JVS(750)&
              &*XX(118)-JVS(935)*XX(132)-JVS(1065)*XX(136)-JVS(1251)*XX(145)-JVS(1339)*XX(147)-JVS(1443)*XX(148)-JVS(1703)&
              &*XX(153)-JVS(1983)*XX(158)
  XX(99) = XX(99)-JVS(934)*XX(132)-JVS(999)*XX(134)-JVS(1099)*XX(138)-JVS(1137)*XX(139)-JVS(1338)*XX(147)-JVS(1442)&
             &*XX(148)-JVS(1517)*XX(149)-JVS(1702)*XX(153)-JVS(1777)*XX(154)-JVS(1982)*XX(158)
  XX(98) = XX(98)-JVS(831)*XX(125)-JVS(1337)*XX(147)-JVS(1441)*XX(148)-JVS(1604)*XX(151)-JVS(1840)*XX(155)
  XX(97) = XX(97)-JVS(529)*XX(104)-JVS(933)*XX(132)-JVS(1025)*XX(135)-JVS(1098)*XX(138)-JVS(1440)*XX(148)-JVS(1516)&
             &*XX(149)-JVS(1701)*XX(153)-JVS(1776)*XX(154)-JVS(1981)*XX(158)
  XX(96) = XX(96)-JVS(1284)*XX(146)-JVS(1439)*XX(148)-JVS(1980)*XX(158)
  XX(95) = XX(95)-JVS(1024)*XX(135)-JVS(1336)*XX(147)-JVS(1438)*XX(148)-JVS(1515)*XX(149)-JVS(1603)*XX(151)-JVS(1700)&
             &*XX(153)-JVS(1775)*XX(154)-JVS(1839)*XX(155)-JVS(1979)*XX(158)
  XX(94) = XX(94)-JVS(932)*XX(132)-JVS(1097)*XX(138)-JVS(1335)*XX(147)-JVS(1437)*XX(148)-JVS(1602)*XX(151)-JVS(1699)&
             &*XX(153)-JVS(1774)*XX(154)-JVS(1838)*XX(155)-JVS(1978)*XX(158)
  XX(93) = XX(93)-JVS(564)*XX(105)-JVS(655)*XX(111)-JVS(763)*XX(119)-JVS(1023)*XX(135)-JVS(1096)*XX(138)-JVS(1167)&
             &*XX(141)-JVS(1283)*XX(146)-JVS(1436)*XX(148)-JVS(1514)*XX(149)-JVS(1698)*XX(153)-JVS(1977)*XX(158)
  XX(92) = XX(92)-JVS(1022)*XX(135)-JVS(1334)*XX(147)-JVS(1435)*XX(148)-JVS(1513)*XX(149)-JVS(1697)*XX(153)-JVS(1773)&
             &*XX(154)-JVS(1976)*XX(158)
  XX(91) = XX(91)-JVS(563)*XX(105)-JVS(1166)*XX(141)-JVS(1282)*XX(146)-JVS(1434)*XX(148)-JVS(1512)*XX(149)-JVS(1696)&
             &*XX(153)-JVS(1975)*XX(158)
  XX(90) = XX(90)-JVS(762)*XX(119)-JVS(1095)*XX(138)-JVS(1333)*XX(147)-JVS(1433)*XX(148)-JVS(1511)*XX(149)-JVS(1695)&
             &*XX(153)-JVS(1772)*XX(154)-JVS(1974)*XX(158)
  XX(89) = XX(89)-JVS(528)*XX(104)-JVS(1186)*XX(142)-JVS(1332)*XX(147)-JVS(1432)*XX(148)-JVS(1510)*XX(149)-JVS(1694)&
             &*XX(153)-JVS(1771)*XX(154)-JVS(1973)*XX(158)
  XX(88) = XX(88)-JVS(674)*XX(112)-JVS(1431)*XX(148)-JVS(1972)*XX(158)
  XX(87) = XX(87)-JVS(867)*XX(128)-JVS(931)*XX(132)-JVS(1094)*XX(138)-JVS(1250)*XX(145)-JVS(1331)*XX(147)-JVS(1430)&
             &*XX(148)-JVS(1693)*XX(153)-JVS(1770)*XX(154)-JVS(1837)*XX(155)
  XX(86) = XX(86)-JVS(1234)*XX(144)-JVS(1330)*XX(147)-JVS(1429)*XX(148)-JVS(1509)*XX(149)-JVS(1692)*XX(153)-JVS(1769)&
             &*XX(154)-JVS(1971)*XX(158)
  XX(85) = XX(85)-JVS(1151)*XX(140)-JVS(1281)*XX(146)-JVS(1428)*XX(148)-JVS(1567)*XX(150)-JVS(1691)*XX(153)-JVS(1886)&
             &*XX(156)-JVS(1970)*XX(158)
  XX(84) = XX(84)-JVS(930)*XX(132)-JVS(1329)*XX(147)-JVS(1427)*XX(148)-JVS(1690)*XX(153)-JVS(1969)*XX(158)
  XX(83) = XX(83)-JVS(790)*XX(121)-JVS(866)*XX(128)-JVS(929)*XX(132)-JVS(1426)*XX(148)-JVS(1836)*XX(155)
  XX(82) = XX(82)-JVS(715)*XX(115)-JVS(749)*XX(118)-JVS(1215)*XX(143)-JVS(1280)*XX(146)-JVS(1425)*XX(148)-JVS(1689)&
             &*XX(153)-JVS(1968)*XX(158)
  XX(81) = XX(81)-JVS(1165)*XX(141)-JVS(1279)*XX(146)-JVS(1424)*XX(148)-JVS(1967)*XX(158)
  XX(80) = XX(80)-JVS(608)*XX(108)-JVS(845)*XX(126)-JVS(928)*XX(132)-JVS(1064)*XX(136)-JVS(1079)*XX(137)-JVS(1136)&
             &*XX(139)-JVS(1233)*XX(144)-JVS(1423)*XX(148)-JVS(1966)*XX(158)
  XX(79) = XX(79)-JVS(607)*XX(108)-JVS(844)*XX(126)-JVS(927)*XX(132)-JVS(1063)*XX(136)-JVS(1078)*XX(137)-JVS(1135)&
             &*XX(139)-JVS(1232)*XX(144)-JVS(1422)*XX(148)-JVS(1965)*XX(158)
  XX(78) = XX(78)-JVS(1093)*XX(138)-JVS(1328)*XX(147)-JVS(1421)*XX(148)-JVS(1566)*XX(150)-JVS(1964)*XX(158)
  XX(77) = XX(77)-JVS(431)*XX(91)-JVS(1249)*XX(145)-JVS(1420)*XX(148)-JVS(1565)*XX(150)-JVS(1963)*XX(158)
  XX(76) = XX(76)-JVS(926)*XX(132)-JVS(1021)*XX(135)-JVS(1327)*XX(147)-JVS(1419)*XX(148)-JVS(1835)*XX(155)-JVS(1962)&
             &*XX(158)
  XX(75) = XX(75)-JVS(344)*XX(78)-JVS(761)*XX(119)-JVS(843)*XX(126)-JVS(1020)*XX(135)-JVS(1092)*XX(138)-JVS(1326)&
             &*XX(147)-JVS(1418)*XX(148)-JVS(1961)*XX(158)
  XX(74) = XX(74)-JVS(760)*XX(119)-JVS(801)*XX(122)-JVS(925)*XX(132)-JVS(1019)*XX(135)-JVS(1417)*XX(148)-JVS(1564)&
             &*XX(150)-JVS(1834)*XX(155)-JVS(1960)*XX(158)
  XX(73) = XX(73)-JVS(654)*XX(111)-JVS(1018)*XX(135)-JVS(1416)*XX(148)-JVS(1508)*XX(149)-JVS(1688)*XX(153)-JVS(1959)&
             &*XX(158)
  XX(72) = XX(72)-JVS(606)*XX(108)-JVS(924)*XX(132)-JVS(1062)*XX(136)-JVS(1077)*XX(137)-JVS(1134)*XX(139)-JVS(1231)&
             &*XX(144)-JVS(1415)*XX(148)-JVS(1958)*XX(158)
  XX(71) = XX(71)-JVS(1414)*XX(148)-JVS(1957)*XX(158)
  XX(70) = XX(70)-JVS(923)*XX(132)-JVS(998)*XX(134)-JVS(1091)*XX(138)-JVS(1325)*XX(147)-JVS(1413)*XX(148)-JVS(1956)&
             &*XX(158)
  XX(69) = XX(69)-JVS(653)*XX(111)-JVS(1017)*XX(135)-JVS(1324)*XX(147)-JVS(1412)*XX(148)-JVS(1507)*XX(149)-JVS(1687)&
             &*XX(153)-JVS(1955)*XX(158)
  XX(68) = XX(68)-JVS(319)*XX(73)-JVS(652)*XX(111)-JVS(759)*XX(119)-JVS(922)*XX(132)-JVS(1016)*XX(135)-JVS(1090)*XX(138)&
             &-JVS(1323)*XX(147)-JVS(1411)*XX(148)-JVS(1833)*XX(155)-JVS(1954)*XX(158)
  XX(67) = XX(67)-JVS(361)*XX(81)-JVS(1278)*XX(146)-JVS(1506)*XX(149)-JVS(1686)*XX(153)-JVS(1953)*XX(158)
  XX(66) = XX(66)-JVS(830)*XX(125)-JVS(921)*XX(132)-JVS(1015)*XX(135)-JVS(1410)*XX(148)-JVS(1832)*XX(155)
  XX(65) = XX(65)-JVS(1185)*XX(142)-JVS(1409)*XX(148)-JVS(1952)*XX(158)
  XX(64) = XX(64)-JVS(722)*XX(116)-JVS(879)*XX(129)-JVS(1277)*XX(146)-JVS(1408)*XX(148)-JVS(1685)*XX(153)-JVS(1951)&
             &*XX(158)
  XX(63) = XX(63)-JVS(854)*XX(127)-JVS(920)*XX(132)-JVS(1089)*XX(138)-JVS(1184)*XX(142)-JVS(1407)*XX(148)-JVS(1950)&
             &*XX(158)
  XX(62) = XX(62)-JVS(1406)*XX(148)-JVS(1949)*XX(158)
  XX(61) = XX(61)-JVS(1248)*XX(145)-JVS(1505)*XX(149)-JVS(1684)*XX(153)-JVS(1768)*XX(154)
  XX(60) = XX(60)-JVS(1183)*XX(142)-JVS(1405)*XX(148)-JVS(1654)*XX(152)-JVS(1948)*XX(158)
  XX(59) = XX(59)-JVS(1601)*XX(151)-JVS(1683)*XX(153)-JVS(1767)*XX(154)-JVS(1831)*XX(155)
  XX(58) = XX(58)-JVS(360)*XX(81)-JVS(1276)*XX(146)-JVS(1504)*XX(149)-JVS(1682)*XX(153)-JVS(1947)*XX(158)
  XX(57) = XX(57)-JVS(359)*XX(81)-JVS(1275)*XX(146)-JVS(1503)*XX(149)-JVS(1681)*XX(153)-JVS(1946)*XX(158)
  XX(56) = XX(56)-JVS(1404)*XX(148)-JVS(1945)*XX(158)
  XX(55) = XX(55)-JVS(901)*XX(131)-JVS(1182)*XX(142)-JVS(1403)*XX(148)-JVS(1944)*XX(158)
  XX(54) = XX(54)-JVS(673)*XX(112)-JVS(1402)*XX(148)-JVS(1911)*XX(157)-JVS(1943)*XX(158)
  XX(53) = XX(53)-JVS(1401)*XX(148)-JVS(1680)*XX(153)-JVS(1766)*XX(154)-JVS(1942)*XX(158)
  XX(52) = XX(52)-JVS(487)*XX(98)-JVS(813)*XX(123)-JVS(1400)*XX(148)-JVS(1941)*XX(158)
  XX(51) = XX(51)-JVS(705)*XX(114)-JVS(1274)*XX(146)-JVS(1399)*XX(148)-JVS(1940)*XX(158)
  XX(50) = XX(50)-JVS(919)*XX(132)-JVS(1398)*XX(148)-JVS(1600)*XX(151)-JVS(1939)*XX(158)
  XX(49) = XX(49)-JVS(672)*XX(112)-JVS(1679)*XX(153)-JVS(1765)*XX(154)-JVS(1910)*XX(157)-JVS(1938)*XX(158)
  XX(48) = XX(48)-JVS(284)*XX(67)-JVS(651)*XX(111)-JVS(918)*XX(132)-JVS(1014)*XX(135)-JVS(1764)*XX(154)
  XX(47) = XX(47)-JVS(917)*XX(132)-JVS(1599)*XX(151)-JVS(1678)*XX(153)-JVS(1763)*XX(154)-JVS(1937)*XX(158)
  XX(46) = XX(46)-JVS(451)*XX(94)-JVS(1677)*XX(153)
  XX(45) = XX(45)-JVS(1397)*XX(148)-JVS(1598)*XX(151)-JVS(1830)*XX(155)
  XX(44) = XX(44)-JVS(562)*XX(105)-JVS(900)*XX(131)-JVS(1396)*XX(148)-JVS(1762)*XX(154)
  XX(43) = XX(43)-JVS(561)*XX(105)-JVS(1164)*XX(141)-JVS(1395)*XX(148)-JVS(1761)*XX(154)
  XX(42) = XX(42)-JVS(605)*XX(108)-JVS(1394)*XX(148)
  XX(41) = XX(41)-JVS(604)*XX(108)-JVS(1393)*XX(148)
  XX(40) = XX(40)-JVS(1392)*XX(148)-JVS(1936)*XX(158)
  XX(39) = XX(39)-JVS(1391)*XX(148)-JVS(1597)*XX(151)
  XX(38) = XX(38)-JVS(1390)*XX(148)-JVS(1502)*XX(149)-JVS(1676)*XX(153)
  XX(37) = XX(37)-JVS(603)*XX(108)-JVS(1389)*XX(148)
  XX(36) = XX(36)-JVS(233)*XX(58)-JVS(650)*XX(111)-JVS(916)*XX(132)-JVS(1013)*XX(135)
  XX(35) = XX(35)-JVS(1653)*XX(152)-JVS(1675)*XX(153)
  XX(34) = XX(34)-JVS(480)*XX(97)-JVS(1674)*XX(153)
  XX(33) = XX(33)-JVS(1673)*XX(153)-JVS(1760)*XX(154)
  XX(32) = XX(32)-JVS(649)*XX(111)-JVS(1012)*XX(135)-JVS(1388)*XX(148)
  XX(31) = XX(31)-JVS(704)*XX(114)-JVS(812)*XX(123)-JVS(1387)*XX(148)
  XX(30) = XX(30)-JVS(228)*XX(57)-JVS(648)*XX(111)-JVS(915)*XX(132)
  XX(29) = XX(29)-JVS(1386)*XX(148)-JVS(1909)*XX(157)
  XX(28) = XX(28)-JVS(248)*XX(61)-JVS(1385)*XX(148)
  XX(27) = XX(27)
  XX(26) = XX(26)
  XX(25) = XX(25)
  XX(24) = XX(24)
  XX(23) = XX(23)
  XX(22) = XX(22)
  XX(21) = XX(21)
  XX(20) = XX(20)
  XX(19) = XX(19)
  XX(18) = XX(18)
  XX(17) = XX(17)
  XX(16) = XX(16)
  XX(15) = XX(15)
  XX(14) = XX(14)
  XX(13) = XX(13)
  XX(12) = XX(12)
  XX(11) = XX(11)
  XX(10) = XX(10)
  XX(9) = XX(9)
  XX(8) = XX(8)
  XX(7) = XX(7)
  XX(6) = XX(6)
  XX(5) = XX(5)
  XX(4) = XX(4)
  XX(3) = XX(3)
  XX(2) = XX(2)
  XX(1) = XX(1)
      
END SUBROUTINE KppSolveTR

! End of KppSolveTR function
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~


! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
! 
! BLAS_UTIL - BLAS-LIKE utility functions
!   Arguments :
! 
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~

!--------------------------------------------------------------
!
! BLAS/LAPACK-like subroutines used by the integration algorithms
! It is recommended to replace them by calls to the optimized
!      BLAS/LAPACK library for your machine
!
!  (C) Adrian Sandu, Aug. 2004
!      Virginia Polytechnic Institute and State University
!--------------------------------------------------------------


!--------------------------------------------------------------
      SUBROUTINE WCOPY(N,X,incX,Y,incY)
!--------------------------------------------------------------
!     copies a vector, x, to a vector, y:  y <- x
!     only for incX=incY=1
!     after BLAS
!     replace this by the function from the optimized BLAS implementation:
!         CALL  SCOPY(N,X,1,Y,1)   or   CALL  DCOPY(N,X,1,Y,1)
!--------------------------------------------------------------
!     USE aromatics_kpp_Precision
      
      INTEGER  :: i,incX,incY,M,MP1,N
      REAL(kind=dp) :: X(N),Y(N)

      IF (N.LE.0) RETURN

      M = MOD(N,8)
      IF( M .NE. 0 ) THEN
        DO i = 1,M
          Y(i) = X(i)
        END DO
        IF( N .LT. 8 ) RETURN
      END IF    
      MP1 = M+1
      DO i = MP1,N,8
        Y(i) = X(i)
        Y(i + 1) = X(i + 1)
        Y(i + 2) = X(i + 2)
        Y(i + 3) = X(i + 3)
        Y(i + 4) = X(i + 4)
        Y(i + 5) = X(i + 5)
        Y(i + 6) = X(i + 6)
        Y(i + 7) = X(i + 7)
      END DO

      END SUBROUTINE WCOPY


!--------------------------------------------------------------
      SUBROUTINE WAXPY(N,Alpha,X,incX,Y,incY)
!--------------------------------------------------------------
!     constant times a vector plus a vector: y <- y + Alpha*x
!     only for incX=incY=1
!     after BLAS
!     replace this by the function from the optimized BLAS implementation:
!         CALL SAXPY(N,Alpha,X,1,Y,1) or  CALL DAXPY(N,Alpha,X,1,Y,1)
!--------------------------------------------------------------

      INTEGER  :: i,incX,incY,M,MP1,N
      REAL(kind=dp) :: X(N),Y(N),Alpha
      REAL(kind=dp), PARAMETER :: ZERO = 0.0_dp

      IF (Alpha .EQ. ZERO) RETURN
      IF (N .LE. 0) RETURN

      M = MOD(N,4)
      IF( M .NE. 0 ) THEN
        DO i = 1,M
          Y(i) = Y(i) + Alpha*X(i)
        END DO
        IF( N .LT. 4 ) RETURN
      END IF
      MP1 = M + 1
      DO i = MP1,N,4
        Y(i) = Y(i) + Alpha*X(i)
        Y(i + 1) = Y(i + 1) + Alpha*X(i + 1)
        Y(i + 2) = Y(i + 2) + Alpha*X(i + 2)
        Y(i + 3) = Y(i + 3) + Alpha*X(i + 3)
      END DO
      
      END SUBROUTINE WAXPY



!--------------------------------------------------------------
      SUBROUTINE WSCAL(N,Alpha,X,incX)
!--------------------------------------------------------------
!     constant times a vector: x(1:N) <- Alpha*x(1:N) 
!     only for incX=incY=1
!     after BLAS
!     replace this by the function from the optimized BLAS implementation:
!         CALL SSCAL(N,Alpha,X,1) or  CALL DSCAL(N,Alpha,X,1)
!--------------------------------------------------------------

      INTEGER  :: i,incX,M,MP1,N
      REAL(kind=dp)  :: X(N),Alpha
      REAL(kind=dp), PARAMETER  :: ZERO=0.0_dp, ONE=1.0_dp

      IF (Alpha .EQ. ONE) RETURN
      IF (N .LE. 0) RETURN

      M = MOD(N,5)
      IF( M .NE. 0 ) THEN
        IF (Alpha .EQ. (-ONE)) THEN
          DO i = 1,M
            X(i) = -X(i)
          END DO
        ELSEIF (Alpha .EQ. ZERO) THEN
          DO i = 1,M
            X(i) = ZERO
          END DO
        ELSE
          DO i = 1,M
            X(i) = Alpha*X(i)
          END DO
        END IF
        IF( N .LT. 5 ) RETURN
      END IF
      MP1 = M + 1
      IF (Alpha .EQ. (-ONE)) THEN
        DO i = MP1,N,5
          X(i)     = -X(i)
          X(i + 1) = -X(i + 1)
          X(i + 2) = -X(i + 2)
          X(i + 3) = -X(i + 3)
          X(i + 4) = -X(i + 4)
        END DO
      ELSEIF (Alpha .EQ. ZERO) THEN
        DO i = MP1,N,5
          X(i)     = ZERO
          X(i + 1) = ZERO
          X(i + 2) = ZERO
          X(i + 3) = ZERO
          X(i + 4) = ZERO
        END DO
      ELSE
        DO i = MP1,N,5
          X(i)     = Alpha*X(i)
          X(i + 1) = Alpha*X(i + 1)
          X(i + 2) = Alpha*X(i + 2)
          X(i + 3) = Alpha*X(i + 3)
          X(i + 4) = Alpha*X(i + 4)
        END DO
      END IF

      END SUBROUTINE WSCAL

!--------------------------------------------------------------
      REAL(kind=dp) FUNCTION WLAMCH( C )
!--------------------------------------------------------------
!     returns epsilon machine
!     after LAPACK
!     replace this by the function from the optimized LAPACK implementation:
!          CALL SLAMCH('E') or CALL DLAMCH('E')
!--------------------------------------------------------------
!      USE aromatics_kpp_Precision

      CHARACTER ::  C
      INTEGER    :: i
      REAL(kind=dp), SAVE  ::  Eps
      REAL(kind=dp)  ::  Suma
      REAL(kind=dp), PARAMETER  ::  ONE=1.0_dp, HALF=0.5_dp
      LOGICAL, SAVE   ::  First=.TRUE.
      
      IF (First) THEN
        First = .FALSE.
        Eps = HALF**(16)
        DO i = 17, 80
          Eps = Eps*HALF
          CALL WLAMCH_ADD(ONE,Eps,Suma)
          IF (Suma.LE.ONE) GOTO 10
        END DO
        PRINT*,'ERROR IN WLAMCH. EPS < ',Eps
        RETURN
10      Eps = Eps*2
        i = i-1      
      END IF

      WLAMCH = Eps

      END FUNCTION WLAMCH
     
      SUBROUTINE WLAMCH_ADD( A, B, Suma )
!      USE aromatics_kpp_Precision
      
      REAL(kind=dp) A, B, Suma
      Suma = A + B

      END SUBROUTINE WLAMCH_ADD
!--------------------------------------------------------------


!--------------------------------------------------------------
      SUBROUTINE SET2ZERO(N,Y)
!--------------------------------------------------------------
!     copies zeros into the vector y:  y <- 0
!     after BLAS
!--------------------------------------------------------------
      
      INTEGER ::  i,M,MP1,N
      REAL(kind=dp) ::  Y(N)
      REAL(kind=dp), PARAMETER :: ZERO = 0.0d0

      IF (N.LE.0) RETURN

      M = MOD(N,8)
      IF( M .NE. 0 ) THEN
        DO i = 1,M
          Y(i) = ZERO
        END DO
        IF( N .LT. 8 ) RETURN
      END IF    
      MP1 = M+1
      DO i = MP1,N,8
        Y(i)     = ZERO
        Y(i + 1) = ZERO
        Y(i + 2) = ZERO
        Y(i + 3) = ZERO
        Y(i + 4) = ZERO
        Y(i + 5) = ZERO
        Y(i + 6) = ZERO
        Y(i + 7) = ZERO
      END DO

      END SUBROUTINE SET2ZERO


!--------------------------------------------------------------
      REAL(kind=dp) FUNCTION WDOT (N, DX, incX, DY, incY) 
!--------------------------------------------------------------
!     dot produce: wdot = x(1:N)*y(1:N) 
!     only for incX=incY=1
!     after BLAS
!     replace this by the function from the optimized BLAS implementation:
!         CALL SDOT(N,X,1,Y,1) or  CALL DDOT(N,X,1,Y,1)
!--------------------------------------------------------------
!      USE messy_mecca_kpp_Precision
!--------------------------------------------------------------
      IMPLICIT NONE
      INTEGER :: N, incX, incY
      REAL(kind=dp) :: DX(N), DY(N) 

      INTEGER :: i, IX, IY, M, MP1, NS
                                 
      WDOT = 0.0D0 
      IF (N .LE. 0) RETURN 
      IF (incX .EQ. incY) IF (incX-1) 5,20,60 
!                                                                       
!     Code for unequal or nonpositive increments.                       
!                                                                       
    5 IX = 1 
      IY = 1 
      IF (incX .LT. 0) IX = (-N+1)*incX + 1 
      IF (incY .LT. 0) IY = (-N+1)*incY + 1 
      DO i = 1,N 
        WDOT = WDOT + DX(IX)*DY(IY) 
        IX = IX + incX 
        IY = IY + incY 
      END DO 
      RETURN 
!                                                                       
!     Code for both increments equal to 1.                              
!                                                                       
!     Clean-up loop so remaining vector length is a multiple of 5.      
!                                                                       
   20 M = MOD(N,5) 
      IF (M .EQ. 0) GO TO 40 
      DO i = 1,M 
         WDOT = WDOT + DX(i)*DY(i) 
      END DO 
      IF (N .LT. 5) RETURN 
   40 MP1 = M + 1 
      DO i = MP1,N,5 
          WDOT = WDOT + DX(i)*DY(i) + DX(i+1)*DY(i+1) + DX(i+2)*DY(i+2) +  &
                   DX(i+3)*DY(i+3) + DX(i+4)*DY(i+4)                   
      END DO 
      RETURN 
!                                                                       
!     Code for equal, positive, non-unit increments.                    
!                                                                       
   60 NS = N*incX 
      DO i = 1,NS,incX 
        WDOT = WDOT + DX(i)*DY(i) 
      END DO 

      END FUNCTION WDOT                                          


!--------------------------------------------------------------
      SUBROUTINE WADD(N,X,Y,Z)
!--------------------------------------------------------------
!     adds two vectors: z <- x + y
!     BLAS - like
!--------------------------------------------------------------
!     USE aromatics_kpp_Precision
      
      INTEGER :: i, M, MP1, N
      REAL(kind=dp) :: X(N),Y(N),Z(N)

      IF (N.LE.0) RETURN

      M = MOD(N,5)
      IF( M /= 0 ) THEN
         DO i = 1,M
            Z(i) = X(i) + Y(i)
         END DO
         IF( N < 5 ) RETURN
      END IF    
      MP1 = M+1
      DO i = MP1,N,5
         Z(i)     = X(i)     + Y(i)
         Z(i + 1) = X(i + 1) + Y(i + 1)
         Z(i + 2) = X(i + 2) + Y(i + 2)
         Z(i + 3) = X(i + 3) + Y(i + 3)
         Z(i + 4) = X(i + 4) + Y(i + 4)
      END DO

      END SUBROUTINE WADD
      
      
      
!--------------------------------------------------------------
      SUBROUTINE WGEFA(N,A,Ipvt,info)
!--------------------------------------------------------------
!     WGEFA FACTORS THE MATRIX A (N,N) BY
!           GAUSS ELIMINATION WITH PARTIAL PIVOTING
!     LINPACK - LIKE 
!--------------------------------------------------------------
!
      INTEGER       :: N,Ipvt(N),info
      REAL(kind=dp) :: A(N,N)
      REAL(kind=dp) :: t, dmax, da
      INTEGER       :: j,k,l
      REAL(kind=dp), PARAMETER :: ZERO = 0.0, ONE = 1.0

      info = 0

size: IF (n > 1) THEN
      
col:  DO k = 1, n-1

!        find l = pivot index
!        l = idamax(n-k+1,A(k,k),1) + k - 1
         l = k; dmax = abs(A(k,k))
         DO j = k+1,n
            da = ABS(A(j,k))
            IF (da > dmax) THEN
              l = j; dmax = da
            END IF
         END DO
         Ipvt(k) = l

!        zero pivot implies this column already triangularized
         IF (ABS(A(l,k)) < TINY(ZERO)) THEN
            info = k
            return
         ELSE   
            IF (l /= k) THEN
               t = A(l,k); A(l,k) = A(k,k); A(k,k) = t
            END IF
            t = -ONE/A(k,k)
            CALL WSCAL(n-k,t,A(k+1,k),1)
            DO j = k+1, n
               t = A(l,j)
               IF (l /= k) THEN
                  A(l,j) = A(k,j); A(k,j) = t
               END IF
               CALL WAXPY(n-k,t,A(k+1,k),1,A(k+1,j),1)
            END DO         
         END IF
         
       END DO col
       
      END IF size
      
      Ipvt(N) = N
      IF (ABS(A(N,N)) == ZERO) info = N
      
      END SUBROUTINE WGEFA


!--------------------------------------------------------------
      SUBROUTINE WGESL(Trans,N,A,Ipvt,b)
!--------------------------------------------------------------
!     WGESL solves the system
!     a * x = b  or  trans(a) * x = b
!     using the factors computed by WGEFA.
!
!     Trans      = 'N'   to solve  A*x = b ,
!                = 'T'   to solve  transpose(A)*x = b
!     LINPACK - LIKE 
!--------------------------------------------------------------

      INTEGER       :: N,Ipvt(N)
      CHARACTER     :: trans
      REAL(kind=dp) :: A(N,N),b(N)
      REAL(kind=dp) :: t
      INTEGER       :: k,kb,l

      
      SELECT CASE (Trans)

      CASE ('n','N')  !  Solve  A * x = b

!        first solve  L*y = b
         IF (n >= 2) THEN
          DO k = 1, n-1
            l = Ipvt(k)
            t = b(l)
            IF (l /= k) THEN
               b(l) = b(k)
               b(k) = t
            END IF
            CALL WAXPY(n-k,t,a(k+1,k),1,b(k+1),1)
          END DO
         END IF
!        now solve  U*x = y
         DO kb = 1, n
            k = n + 1 - kb
            b(k) = b(k)/a(k,k)
            t = -b(k)
            CALL WAXPY(k-1,t,a(1,k),1,b(1),1)
         END DO
      
      CASE ('t','T')  !  Solve transpose(A) * x = b

!        first solve  trans(U)*y = b
         DO k = 1, n
            t = WDOT(k-1,a(1,k),1,b(1),1)
            b(k) = (b(k) - t)/a(k,k)
         END DO
!        now solve trans(L)*x = y
         IF (n >= 2) THEN
         DO kb = 1, n-1
            k = n - kb
            b(k) = b(k) + WDOT(n-k,a(k+1,k),1,b(k+1),1)
            l = Ipvt(k)
            IF (l /= k) THEN
               t = b(l); b(l) = b(k); b(k) = t
            END IF
         END DO
         END IF
   
      END SELECT

      END SUBROUTINE WGESL
! End of BLAS_UTIL function
! ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~



END MODULE aromatics_kpp_LinearAlgebra

